Which of the following statements alone is enough to prove that a parallelogram is a rectangle?

Which Of The Following Statements Alone Is Enough To Prove That A Parallelogram Is A Rectangle?

Answers

Answer 1

The statement that alone is enough to prove that a parallelogram is a rectangle is Opposite sides of the quadrilateral must be congruent and one angle must be 90 degrees

Option A is the correct answer.

We have,

A rectangle is a type of parallelogram with four right angles.

So, if a quadrilateral has opposite sides that are congruent and one angle is 90 degrees, then it must be a parallelogram with four right angles, i.e., a rectangle.

Statement 2 describes the properties of a rhombus, which is a special type of parallelogram with all sides congruent, not a rectangle.

Statement 3 describes the properties of a parallelogram, but it does not guarantee that the angles are right angles.

Therefore, it does not prove that the parallelogram is a rectangle.

Statement 4 describes the properties of a square, which is a special type of rectangle with all sides congruent, not a general rectangle.

Thus,

Opposite sides of the quadrilateral must be congruent and one angle must be 90 degrees is enough to prove that a parallelogram is a rectangle.

Learn more about parallelograms here:

https://brainly.com/question/1563728

#SPJ1


Related Questions

Explain the steps to measuring an angle using a protractor. How do you determine an angle’s measurement in degrees?

Answers

An angle is formed between two rays that are joined together at a single point ( vertex). Protractor helps to determine the measure of angle in degrees but with following the some steps of measurement.

An angle is a geometric shape formed when two rays meet at a point. A protractor is a measuring device, usually made of plastic or glass, used to measure angles. Some protractors are simple half disks or full circles. This is a protractor that helps you measure angles in degrees. Method of measuring an angle with the protractor:

Place the center of the protractor at the vertex of the angle.Fix the protractor with one arm of the angle at the base of the protractor (don't move the vertex).Look at the balance where the base arm is pointing at 0 degrees.Symbols in degrees from 0 to 180 degrees. It can be used directly to measure any angle from 0 to 360 degrees. Read the scale at the angle where the other arm passes the scale.

So, using the above steps we can determine an angle’s measurement in degrees. For example if you wants to measure angle ∠ABC. Then follow the above steps and place the protactor like in figure 2. After right placement, we can easily measure the angle. Hence, the measure of angle

∠ABC is 40°.

For more information about angle, visit :

https://brainly.com/question/25716982

#SPJ4

Which relation is a function?

Answers

Only table 2 is a function since it is a one to one mapping

What is a function?

A function is a one-to-one mapping of an equation.

Since we have four expressions to determine if they are functions, we notice that

Expressions 1, 3 and 4 have more than one y value for the same value of x. so, they are one to many mappings and thus not functions.Also, we notice that table 2 has only one value of y for one value of x and thus one to one mappins and thus a function

So, only table 2 is a function

Learn more about functions here:

https://brainly.com/question/10439235

#SPJ1

again my friend needs help and I'm not sure what this is

Answers

Note that the volume of the smaller cone is Vs = 900cm³

How do you calculate the volume of the smaller cone ?

We must use the formula for the volume of a cone in this prompt.

V = (1/3) x   π x r ² x h

where V is the volume  r is the radiush is the height.

Let's assume that the radius of the bigger cone is R, and the radius of the smaller   cone is r.

Since the cones are similar, we knw that the ratio of the heights is the same as the ratio of  the radii

8 / 4 = R / r

Simplifying this equation, we can state

2 = R / r

This is also

R = 2r

So substituting into the expression for the bigger cone we say

Vb = (1/3) x π x (2r)² x 8

(1/3) x π x (2r)² x 8= 3600
8.37758040957 x (2r)² = 3600

2r² = 3600/8.37758040957

2r² = 429.718346348

r² = 214.859173174

r = 14.6580753571

So we can now enter tis into the expression for the smaller volume:

Vs = (1/3) x pi x 14.6580753571² x4

Vs = (1/3) x 3.14159265359 x 214.85917317442229252041 x4

Vs = 900cm³

So we are correct to state that the volume of the smaller cone is 900cm³

Learn more about cone:
https://brainly.com/question/16394302
#SPJ1

For what values of a and c is the piecewise function f(x) = {ax^2 + sin x, x lessthanorequalto pi 2x - c, x > pi differentiable? A = 3 pi/2 and c = pi/2 a = 3/2 pi and c = 7 pi/2 a = 3/2 pi and c = - pi/2 a = 3/2 pi and c = pi/2 a = 3 pi/2 and c = 2/pi

Answers

The values of a and c for which f(x) = {ax^2 + sin x, x ≤ π; 2x - c, x > π} is differentiable at x = π are a = 3π/2 and c = 2/π.

For the piecewise function f(x) to be differentiable at the point x = pi, the left-hand limit and right-hand limit of the derivative of f(x) must be equal. Therefore, we need to find the derivative of f(x) separately for x ≤ π and x > π and then evaluate the limits of these derivatives at x = π.

For x ≤ π:

f'(x) = 2ax + cos(x)

For x > π:

f'(x) = 2

To ensure that f(x) is differentiable at x = π, we need the left-hand and right-hand limits of f'(x) to be equal:

lim f'(x) = lim (2ax + cos(x)) = 2a - 1

x → π- x → π+

lim f'(x) = lim 2 = 2

x → π+ x → π+

Therefore, we need to have 2a - 1 = 2, which gives a = 3/2.

Now we need to check which of the given values of c satisfies the condition that f(x) is differentiable at x = π.

a) a = 3π/2 and c = π/2:

For x ≤ π:

f'(x) = 3πx + cos(x)

For x > π:

f'(x) = 2

Therefore, f(x) is not differentiable at x = π because the left-hand and right-hand limits of f'(x) are not equal.

b) a = 3/2π and c = 7π/2:

For x ≤ π:

f'(x) = (3/2π)x + cos(x)

For x > π:

f'(x) = 2 - 3c/2π = -7/2

Therefore, f(x) is not differentiable at x = π because the left-hand and right-hand limits of f'(x) are not equal.

c) a = 3/2π and c = -π/2:

For x ≤ π:

f'(x) = (3/2π)x + cos(x)

For x > π:

f'(x) = 2 - 3c/2π = 5/2

Therefore, f(x) is not differentiable at x = π because the left-hand and right-hand limits of f'(x) are not equal.

d) a = 3/2π and c = π/2:

For x ≤ π:

f'(x) = (3/2π)x + cos(x)

For x > π:

f'(x) = 2 - 3c/2π = -1/2

Therefore, f(x) is not differentiable at x = π because the left-hand and right-hand limits of f'(x) are not equal.

e) a = 3π/2 and c = 2/π:

For x ≤ π:

f'(x) = 3πx + cos(x)

For x > π:

f'(x) = 2 - 3c/2π = -1/π

Therefore, f(x) is differentiable at x = π because the left-hand and right-hand limits of f'(x) are equal.

Therefore, the values of a and c for which f(x) = {ax^2 + sin x, x ≤ π; 2x - c, x > π} is differentiable at x = π are a = 3π/2 and c = 2/π.

To learn more about differentiable visit: https://brainly.com/question/31495179

#SPJ11

use the given information to determine the remaining five trigonometric values. rationalize any denominators that contain radicals. (enter your answers in exact form.) csc a = 3/2, 90° < a < 180°sin A =cos A=tan A =cot A= Sec A=

Answers

Not possible since the value of sin(a) must lie between -1 and 1. Therefore, there is no solution for this problem.

We know that:

csc(a) = 3/2

Since csc(a) = 1/sin(a), we can find sin(a) as:

1/sin(a) = 3/2

Cross-multiplying, we get:

2sin(a) = 3

Dividing by 2, we get:

sin(a) = 3/2

This is not possible since the value of sin(a) must lie between -1 and 1. Therefore, there is no solution for this problem.

To learn more about possible visit:

https://brainly.com/question/30584221

#SPJ11

The spacing between lines in the pure rotational spectrum of 7Li^35 Cl is 4.236 x 1040 s-1. The atomic masses for Li and 35Cl are 7.0160 amu and 34.9688 amu, respectively.
Part A Calculate the bond length of this molecule. Express your answer to four significant figures and include the appropriate units. ? ro =

Answers

Significant figures and include the appropriate units is [tex]r = 1.166 \times 10^{(-10)}[/tex]

Calculate the bond length of this molecule?

Count up all of the bonds. Determine how many bond groups there are between individual atoms. By the total number of bonding groups in the molecule, divide the number of bonds between atoms. X-Ray crystallography is the only reliable method of determining molecule size. This gives you the crystal structure, including the positions of every atom, and you consequently know the size of the molecule. Any substance that can be crystallised can be used in this procedure, even huge molecules like protein and DNA.

spacing between lines [tex]=4.236*10^{10} s^{(-1)}[/tex]

atomic mass of Li = 7.0160 amu

atomic mass of cl = 34.9688

Bond length of molecule

B = h*c*B

[tex]6.626*10^{(-34)} J*S*3*10^{(10)} cm/s*2.118*10^{(10)} 1/cm[/tex]

[tex]B=42.06 \times 10^{(-24)}J[/tex]

Now according to relation

[tex]B=\frac{h^2}{8\pi^2 I}[/tex]

where I is moment of inertia

[tex]I=\frac{h^2}{8\pi^2 B}[/tex]

[tex]=(6.62*10^{(-34)})^2(JS)^2/8*(3.14)^2*(42.06*10^{(-24)})\\\\= 13.20*10^{(-47)}[/tex]

Calculate,

[tex]K=\frac{7.0160*34.968}{7.0160+34.9688} /\frac{10^{(-3)}kg/mol}{6.022*10^{(23)} mol^{(-1)}}[/tex]

[tex]= 0.970*10^{(-26)}kg[/tex]

[tex]I = \mu r^2 \\\\I=\sqrt{\frac{I}{\mu} }[/tex]

[tex]I=\sqrt{\frac{13.20\times 10^{-47 kg\ mx^2}}{0.970\times 10^{-26}kg} }[/tex]

[tex]r=1.166\times 10^{(-10)}[/tex]

To know more about units, visit:

https://brainly.com/question/4895463

#SPJ1

Experimental data for the motion of a particle along a straight line yield measured values of the velocity v for various displacements S. A smooth curve is drawn through the points as shown in the graph.
Determine the acceleration of the particle when S = 40 m.

Answers

The acceleration of the particle at S = 40 m is approximately 2[tex]m/s^2[/tex]

To determine the acceleration of a particle when its displacement is 40 m using experimental data?

To determine the acceleration of the particle when S = 40 m, we need to use the information given in the graph. The graph shows the velocity of the particle as a function of its displacement, S. Recall that acceleration is the rate of change of velocity with respect to time.

We can estimate the acceleration at S = 40 m by finding the slope of the tangent line to the velocity curve at that point.

One way to estimate the slope of the tangent line is to draw a line that is as close as possible to the curve at the point S = 40 m, and then find the slope of that line. We can use a ruler to draw a tangent line that intersects the curve at S = 40 m, as shown in the graph.

We then measure the displacement and velocity of two points on the tangent line, one on either side of S = 40 m. For example, we might choose the points S = 35 m and S = 45 m, and find their corresponding velocities, which are approximately v = 25 m/s and v = 45 m/s, respectively.

The slope of the tangent line is then given by the change in velocity over the change in displacement:

acceleration = (v2 - v1) / (S2 - S1)

Substituting the values we found, we get:

acceleration = (45 m/s - 25 m/s) / (45 m - 35 m) = 2[tex]m/s^2[/tex]

Therefore, the acceleration of the particle at S = 40 m is approximately 2[tex]m/s^2[/tex].

Learn more about acceleration

brainly.com/question/12550364

#SPJ11

find an equation of a parabola that has curvature 4 at the origin. (assume the parabola has its vertex at the origin, and opens upward.) y(x) =

Answers

The equation of the parabola that has curvature 4 at the origin and opens upward is:

y(x) = 2x^2

To find the equation of a parabola with curvature 4 at the origin, we need to use the formula for curvature and the fact that the vertex of the parabola is at the origin. The formula for curvature of a function y(x) is given by:
k = |(y''(x))/(1 + (y'(x))^2)^(3/2)|
where y''(x) represents the second derivative of the function and y'(x) represents the first derivative of the function.
Since the vertex of the parabola is at the origin, we know that the equation of the parabola can be written as:
y(x) = ax^2
where a is a constant. Now, we can find the second derivative of this equation:
y''(x) = 2a
Next, we can find the first derivative of the equation:
y'(x) = 2ax
Using these values, we can plug them into the formula for curvature:
k = |(2a)/(1 + (2ax)^2)^(3/2)| We know that the curvature at the origin is 4, so we can set k equal to 4 and solve for a:
4 = |(2a)/(1 + (2*0)^2)^(3/2)|
4 = 2a
a = 2 Therefore, the equation of the parabola that has curvature 4 at the origin and opens upward is:  y(x) = 2x^2

For more such question on parabola

https://brainly.com/question/29635857

#SPJ11

How much will a customer pay for an article marked at $360, if sales tax of 20% is charged?

Answers

Step-by-step explanation:

They will pay $ 360    PLUS 20% of 360        (20% is .20 in decimal)

$   360 ( 1 + .20)  

 $  360 ( 1.20) = $ 432

How can we reduce bias in an estimator: OA. use nonrandom sampling. B. use random sampling. C. increase the number of items included in the sample. D. decrease the number of items included in the sample.

Answers

To reduce bias in an estimator, (B) use random sampling and (C) increase the number of items included in the sample. Random sampling ensures that each member of the population has an equal chance of being selected, while increasing the sample size reduces sampling error and increases the representativeness of the sample.

To reduce bias in an estimator, it is important to use random sampling rather than nonrandom sampling. Random sampling ensures that every item in the population has an equal chance of being included in the sample, which helps to eliminate any potential bias. Additionally, increasing the number of items included in the sample can also help to reduce bias by providing a more representative sample. However, decreasing the number of items included in the sample can actually increase bias as it may not accurately represent the population. Therefore, it is important to use random sampling and include a sufficient number of items in the sample to reduce bias in an estimator.

Learn more about statistics here: brainly.com/question/14128303

#SPJ11

Report the correlation between gestation and longevity and comment on the strength and direction of the relationship. Interpret your findings in context. Now return to the scatterplot that you created earlier. Notice that there is an outlier in both longevity (40 years) and gestation (645 days). Note: This outlier corresponds to the longevity and gestation period of the elephant.

What do you think will happen to the correlation if we remove this outlier?

Answers

The correlation between gestation and longevity is positive and strong.

This means that as gestation increases, longevity also tends to increase. The outlier (elephant) with 645 days of gestation and 40 years of longevity may affect the correlation.

If we remove the outlier, the correlation between gestation and longevity is likely to weaken.

The outlier (elephant) has extreme values for both gestation and longevity, and removing it would lead to a more balanced distribution of data points.

This might result in a weaker but still positive correlation, suggesting that the relationship between gestation and longevity is not as strong as initially observed. In conclusion, the outlier plays a significant role in the observed correlation, and removing it would affect the strength of the relationship.

To know more about longevity click on below link:

https://brainly.com/question/14004143#

#SPJ11

for y=ln(x7 3x−9), to find y′ would require the chain rule. if y=f(g(x)), find an f(x) and g(x) that would allow you to use the chain rule

Answers

y' = (2x - 5)/(x^2 - 5x + 2)

Using the chain rule in this way allows us to differentiate more complicated functions by breaking them down into simpler functions and applying the chain rule appropriately.

In order to use the chain rule, we need to have a function of the form y=f(g(x)), where g(x) is the inner function and f(x) is the outer function.

One possible choice of f(x) and g(x) that would allow us to use the chain rule is:

g(x) = x^2 - 5x + 2
f(u) = ln(u)

Then, we can write:

y = f(g(x)) = ln(x^2 - 5x + 2)

To find y', we need to apply the chain rule:

y' = f'(g(x)) * g'(x) = 1/(x^2 - 5x + 2) * (2x - 5)

Therefore,

y' = (2x - 5)/(x^2 - 5x + 2)

Using the chain rule in this way allows us to differentiate more complicated functions by breaking them down into simpler functions and applying the chain rule appropriately.

Visit to know more about Chain rule:-

brainly.com/question/30396691

#SPJ11

NEED ALL QUESTIONS ANSWERED!!! 100 POINTS


After a dreary day of rain, the sun peeks through the clouds and a rainbow forms. You notice the rainbow is the shape of a parabola.

The equation for this parabola is y = -x2 + 36.
Graph of a parabola opening down at the vertex 0 comma 36 crossing the x–axis at negative 6 comma 0 and 6 comma 0.

In the distance, an airplane is taking off. As it ascends during take-off, it makes a slanted line that cuts through the rainbow at two points. Create a table of at least four values for the function that includes two points of intersection between the airplane and the rainbow.

Analyze the two functions. Answer the following reflection questions in complete sentences.

What is the domain and range of the rainbow? Explain what the domain and range represent. Do all of the values make sense in this situation? Why or why not?
What are the x- and y-intercepts of the rainbow? Explain what each intercept represents.
Is the linear function you created with your table positive or negative? Explain.
What are the solutions or solution to the system of equations created? Explain what it or they represent.
Create your own piecewise function with at least two functions. Explain, using complete sentences, the steps for graphing the function. Graph the function by hand or using a graphing software of your choice (remember to submit the graph).

Answers

The solution of both intersections shows where the plane intersects the rainbow.


What is a Math Function?

A precise definition of function finds its roots in mathematics, wherein it is a principle that connects an item from one group (also known as the domain) to a definite element within another group (the range or codomain).

Symbolically expressed by varied means like equations, graphs, and tables. The importance of models based on functions can hardly be overstated, since they reveal links between various factors across disciplines such as physics, engineering, economics, and computer science.

Various examples of crucial functions are linear, quadratic, exponential, trigonometric, and logarithmic - all well-known amongst mathematicians worldwide.

Read more about math functions here:

https://brainly.com/question/11624077

#SPJ1

which of the following expressions is equivalent to 3^x+2

Answers

Answer: Option D 9(3)^x

Step-by-step explanation:

3^x+2 = 9(3)^x

9= 3^2

whenever there are same 2 numbers in multiplication, there powers are added.

Therefore, 3^2(3^x) = 3^(x+2)

If 5 wholes are divided into pieces that are each 1 4 4 1 ​ start fraction, 1, divided by, 4, end fraction of a whole, how many pieces are there?

Answers

If 5 wholes are divided into pieces that are each [tex]$\frac{1}{4}$[/tex] start fraction, 1, divided by, 4, end fraction of a whole, there are 20 pieces.

What is fraction?

In mathematics, a fraction represents a part of a whole or a collection of equal parts. It is a way of representing a number as a ratio of two integers, where the top number is called the numerator and the bottom number is called the denominator.

According to given information:

If 5 wholes are divided into pieces that are each [tex]$\frac{1}{4}$[/tex] of a whole, we can find the total number of pieces by multiplying the number of pieces in one whole by the number of wholes:

Number of pieces in one whole=

[tex]$\frac{1}{\frac{1}{4}} = 4$[/tex]

Number of pieces in 5 wholes = 5 x 4 = 20

Therefore, there are 20 pieces.

To know more about fraction visit:

https://brainly.com/question/78672

#SPJ1

Of the marbles in a bag, 2 are blue, 5 are yellow, and 2 are white. Sandra will randomly choose one marble from the bag.

Answers

Answer: The probability of Sandra choosing a blue marble is 2/9, the probability of choosing a yellow marble is 5/9, and the probability of choosing a white marble is 2/9.

Step-by-step explanation:

There are a total of 2 + 5 + 2 = 9 marbles in the bag.

The probability of Sandra choosing a blue marble is 2/9 because there are 2 blue marbles out of 9 total marbles.

The probability of Sandra choosing a yellow marble is 5/9 because there are 5 yellow marbles out of 9 total marbles.

The probability of Sandra choosing a white marble is 2/9 because there are 2 white marbles out of 9 total marbles.

The sum of these probabilities is equal to 1, as Sandra must choose one marble and it must be one of the available options:

2/9 + 5/9 + 2/9 = 9/9 = 1

how many different eight-card hands are there with no more than three red cards?

Answers

There are 56,750,808 different eight-card hands with no more than three red cards. This can be answered by the concept of combination formula.

To solve this problem, we first need to determine the total number of eight-card hands, which is given by the combination formula:

C(52,8) = 52! / (8! × 44!) = 74, 957, 440

This represents the total number of ways to choose eight cards from a deck of 52 cards.

Next, we need to calculate the number of eight-card hands with more than three red cards. We can do this by breaking it down into cases:

Case 1: Four red cards
We need to choose four red cards from the 26 available, and four non-red cards from the remaining 26:

C(26,4) × C(26,4) = 14,950,976

Case 2: Five red cards
We need to choose five red cards from the 26 available, and three non-red cards from the remaining 26:

C(26,5) × C(26,3) = 2,786,040

Case 3: Six red cards
We need to choose six red cards from the 26 available, and two non-red cards from the remaining 26:

C(26,6) × C(26,2) = 230,230

Case 4: Seven red cards
We need to choose seven red cards from the 26 available, and one non-red card from the remaining 26:

C(26,7) × C(26,1) = 9,156

Case 5: Eight red cards
We need to choose eight red cards from the 26 available:

C(26,8) = 230,230

To get the total number of eight-card hands with more than three red cards, we simply add up the results of these five cases:

14,950,976 + 2,786,040 + 230,230 + 9,156 + 230,230 = 18,206,632

Finally, to get the number of eight-card hands with no more than three red cards, we subtract the result of the above calculation from the total number of eight-card hands:

74, 957, 440 - 18,206,632 = 56,750,808

Therefore, there are 56,750,808 different eight-card hands with no more than three red cards.

To learn more about combination formula here:

brainly.com/question/14685054#

#SPJ11

Suppose we are given the following information about a signal x[n]: 1. x[n] is a real and even signal. 2. x[n] has period N = 10 and Fourier coefficients ar. 3. Q11 = 5. 4. To Ślx[n]? = 50. n=0 A cos(Bn+C), and specify numerical values for the constants Show that x[n] = A cos(Bn+C), and specify numer B, and C.

Answers

The signal x[n] is:  x[n] = 19 cos((pi/5)n - pi/2).

The numerical values for A, B, and C are:

A = [tex]sqrt(2 * a0^2 - a5^2)[/tex]

B = [tex]2 * pi / N[/tex]

C = [tex]arctan((a5 / sqrt(2 * a0^2 - a5^2)) / tan(5 * pi / N))[/tex]

How can we show that x[n] =A cos(Bn+C), and specify numbers B, and C?

The given information about the signal x[n] can be used to find the constants A, B, and C in the representation of x[n] as:

x[n] = A cos(Bn + C)

where A, B, and C are constants. We have:

x[n] is a real and even signal with period N=10

The Fourier coefficient a0 is 11

The Fourier coefficient a5 is 5

The energy of x[n] is 50

The numerical values for A, B, and C can be found as follows:

A = [tex]sqrt(2 * a0^2 - a5^2) = sqrt(2 * 11^2 - 5^2)[/tex] = 19

B = [tex]2 * pi / N[/tex] = pi / 5

C = [tex]-arctan(a5 / sqrt(2 * a0^2 - a5^2)) = -arctan(5 / sqrt(2 * 11^2 - 5^2)) = -pi/2[/tex]

Therefore, the signal x[n] can be represented as:

x[n] = 19 cos((pi/5)n - pi/2)

Learn more about coefficients

https://brainly.com/question/28975079

#SPJ11

What mixed number would be plotted where the arrow is pointing on the number line?

Number line with plotted numbers 0, 1, 2, 3, 4, and 5. Between each whole number, it is partitioned into fourths. There is a red arrow pointing to the tick mark one hop to the right of the number 2

Answers

The number line with plotted numbers 0, 1, 2, 3, 4, and 5 is present in above figure. The mixed number would be plotted where the arrow is pointing on the number line is equals to the [tex]2\frac{ 1}{4} [/tex].

A fraction, often called a fraction, is a combination of a number (integer) and a fraction (part of a whole number). So it has two parts. [tex]4 \frac{1}{7} [/tex] is an example of a mixed number. A number line is a horizontal line in which numbers are evenly distributed. It is used to pictorial representation of numbers. We have numbers for plotting on number line and conditions for plotting are

0, 1, 2, 3, 4, and 5 on number line Between each whole number, it is partitioned into fourths.There is a red arrow pointing to the tick mark on top to the right of the number 2.

Now, the plotted number line is present in above figure. See the figure carefully. From the figure the mixed number that would plotted on red mark is [tex]2 \frac{1}{4} [/tex].

For more information about mixed numbers, visit :

https://brainly.com/question/21610929

#SPJ4

Mr. Chan pays $8 to fill a 2-gallon can with gas for his lawn mower. At this rate, how
much will Mr. Chan pay to put 13 gallons of gas in his car?
A. $104.00
B. $52.00
C. $26.00
D. $3.25

Answers

Answer: b. $52.00

Step-by-step explanation:

Find the theoretical probability of the event occurring on a single roll of a number cube. P(multiple of 3) = A) 0
B) 1/3
C) 1/2
D) 2/3​

Answers

Answer:

B) 1/3.

Step-by-step explanation:

There are six possible outcomes when rolling a number cube, and two of them are multiples of 3 (3 and 6). Therefore, the theoretical probability of rolling a multiple of 3 on a single roll of a number cube is 2/6, which simplifies to 1/3.

Therefore, the answer is B) 1/3.

he odds against a horse winning a race were set at 7 to 1. the probability of that horse not winning the race is

Answers

The probability of the horse not winning the race is 0.875 or 7/8, given that the odds against the horse winning the race were set at 7 to 1.

How to find the probability of the horse not winning the race?

When the odds against a horse winning a race are set at 7 to 1, it means that for every 7 times the horse loses, it will win once. In other words, the probability of the horse winning is 1/8 or 0.125.

To find the probability of the horse not winning the race, we can subtract the probability of winning from 1. So, the probability of the horse not winning is:

1 - 0.125 = 0.875 or 7/8

This means that there is a 7/8 chance that the horse will lose the race. It is important to note that the odds and probabilities are two different ways of expressing the same information. The odds are a ratio of the probability of winning to the probability of losing, while the probability is simply the chance of an event occurring.

Learn more about Probability

brainly.com/question/30034780

#SPJ11

Newton's First Law - Worksheet
Focus Question: Does the speed of a car affect its stopping distance
Background Information Speed mit signs are posted on nearly every road.
Speed limits vary by location and are based on different factors, such as curvature
of the road, school rones, and how heavily populated an area is. Generally,
speed limits are higher on highways and lower in areas where people live.
Speed limits keep people safe because they keep cars from going too fast. The
faster a car is traveling, the longer it will take the car to stop. In areas where a
child might chase a ball into the road or someone may cross the street, it is important that a driver can
Pop very quickly if they are traveling over the speed limit, the driver will be much less likely to be
able to dop the car in an emergency. So, speed limits help limit driver speeds, which in turn helps
limit the time it takes to stop a moving car.
Today, you will be discovering how the speed of a car affects its stopping distance. Stopping distance
is the distance that a car continues to travel after the driver has applied the brakes.
Speed
(mph)
15
Graphing: The speeds listed in the data table below represent how fast an average car is travelling on
a straight, dry road. The Total Stopping Distance is the distance that a car would take to
come to a complete stop after a driver sees something in the road and stops the car. On
the back of this page, graph the data shown.
20
25
30
35
40
45
50
55
Total Stopping
Distance (feet)
26
40
56
74
96
119
145
174
205
SPEED
LIMIT
Speed
(mph)
60
65
70
75
80
85
90
95
100
55
239
275
314
Total Stopping
Distance (feet)
355
398
445
493
544
598
CFlying Colors Science

Answers

It can be seen that the car's stopping distance depends upon the initial speed.

Yes the speed of the car affects its stopping distance when the brakes are applied. Assume the initial velocity to be 'u' and after deaccelerating at 'a' m/s², the car stops after distance 'S'. Now, we can write that -

S = ut + 1/2 at²

We can also write -

v = u + at

t = (v - u)/a

t = - u/a       {final velocity is zero}

Then, we can write that -

S = u x (-u/a) + 1/2 a(- u/a)²

S = u x (-u/a) + 1/2 x a x u²/a²

S = - u²/a + u²/2a

S = u²/a(1/2 - u)

So, it can be seen that the car's stopping distance depends upon the initial speed.

To solve more questions on Newton's first law, visit the link below -

https://brainly.com/question/29775827

#SPJ1

state whether the sequence an=(2n 1)2(5n−1)2 converges and, if it does, find the limit. a) converges to 1b) converges to 3/5c) divergesd) converges to 9/25e) converges to 0

Answers

The given sequence an=(2n 1)2(5n−1)2 converges or diverges with the same behavior as the sequence (4/25)^n. The option that suits the answer is option c.diverges. With the limit (4/25)

To determine if the sequence converges or diverges, we can use the limit definition of convergence.

First, we can simplify the expression inside the parentheses:

(2n + 1)^2 / (5n - 1)^2 = (4n^2 + 4n + 1) / (25n^2 - 10n + 1)

Then, we can use the fact that for two sequences {a_n} and {b_n}, if a_n / b_n converges to a non-zero constant, then {a_n} and {b_n} have the same convergence behavior.

So, let's take the limit of this new expression:

lim (n → ∞) [(4n^2 + 4n + 1) / (25n^2 - 10n + 1)]

We can use the highest degree terms in the numerator and denominator to simplify:

lim (n → ∞) [(4n^2 / 25n^2)]

This simplifies to:

lim (n → ∞) (4/25)

Since this limit is a non-zero constant, we can conclude that the sequence {an} converges or diverges with the same behavior as the sequence (4/25)^n.

Thus, the answer is (c) diverges.

Learn more about diverges: https://brainly.com/question/17177764

#SPJ11

Construct the exponential function that contains the points (0,-2) and (3,-128) Provide your answer below:

Answers

To construct the exponential function that contains the points (0,-2) and (3,-128), we can use the general form of an exponential function:

y = a * b^x

where y is the function value, x is the input value, b is the base of the exponential function, and a is a constant representing the y-intercept. To find the specific exponential function that contains the two given points, we need to solve for a and b using the given coordinates.

First, we can use the point (0,-2) to find the value of a:

-2 = a * b^0
-2 = a * 1
a = -2

Next, we can use the point (3,-128) to find the value of b:

-128 = -2 * b^3
64 = b^3
b = 4

Now that we know the values of a and b, we can write the exponential function:

y = -2 * 4^x

Therefore, the exponential function that contains the points (0,-2) and (3,-128) is y = -2 * 4^x.

To view a related problem visit : https://brainly.com/question/18891502

#SPJ11

For the hypothesis test againstH_{0}:\mu =5againstH_{1}:\mu \neq 5and variance known, calculate the P-value for each of the following test statistics. Round your answers to four decimal places (e.g. 98.7654).
a.z_{0}=2.54
b.z_{0}=-1.78
c.z_{0}=0.48
a.____________________
b.____________________
c.____________________

Answers

(a) P-value for z₀=1.88 is 0.0614

(b) P-value for z₀=−1.92 is 0.0548

(c) P-value for  z₀=0.43 is 0.6672

Assuming a two-tailed test with a significance level of α=0.05, we can calculate the P-value for each test statistic using the standard normal distribution

(a) z₀=1.88

P-value = P(Z > 1.88) + P(Z < -1.88)

= 2 × (1 - P(Z < 1.88))

= 2 × (1 - 0.9693)

= 0.0614

(b) z₀=−1.92

P-value = P(Z < -1.92) + P(Z > 1.92)

= 2 × (1 - P(Z < 1.92))

= 2 × (1 - 0.9726)

Do the arithmetic operation

= 0.0548

(c) z₀=0.43

P-value = P(Z > 0.43) + P(Z < -0.43)

= 2 × (1 - P(Z < 0.43))

= 2 × (1 - 0.6664)

= 0.6672

Learn more about p-value here

brainly.com/question/30461126

#SPJ4

etermine if the following matrix is invertible. explain why. [1 2 0]
[3 4 0]
[5 6 0]

Answers

In this case, the third column of matrix A is a linear combination of the first two columns, which makes the matrix singular and not invertible.

What is matrix?

A matrix is a rectangular array of numbers or other mathematical objects, such as polynomials or functions, arranged in rows and columns.

Matrices are used to represent linear transformations, systems of linear equations, and other mathematical structures and operations.

To determine if a matrix is invertible or not, we need to calculate its determinant.

The given matrix is:

A = [1 2 0; 3 4 0; 5 6 0]

The determinant of  3x3 matrix is given by -

determinant(A) = a11(a22a33 - a23a32) - a12(a21a33 - a23a31) + a13(a21a32 - a22a31)

where aij is the element in i th row and j th column of the matrix.

By substituting the values from matrix A-

det(A) = 1(40 - 06) - 2(30 - 05) + 0(36 - 45)

det(A) = 0

Since the determinant of A is equal to zero, we can conclude that the matrix A is not invertible.

The matrix can be  invertible if and only if its determinant is nonzero. When the determinant is zero, the matrix is said to be singular, which means that its rows or columns are linearly dependent, and it cannot be inverted.

To know more about determinant visit:

https://brainly.com/question/14474654

#SPJ1

: A quadratic function is given. f(x) = x2 + 2x - 6 (a) Express the quadratic function in standard form f(x) = (b) Sketch its graph. (c) Find its maximum or minimum value. f(x) = maximum value minimum value

Answers

For the quadratic function,

(a) Standard form: f(x) = (x + 1)^2 - 7

(b) Its graph will be a parabola opening upward

(c) Minimum value: f(x) = -7


(a) To express the quadratic function f(x) = x^2 + 2x - 6 in standard form, we complete the square.

f(x) = (x^2 + 2x) - 6
To complete the square, take half of the linear coefficient (2) and square it: (2/2)^2 = 1.

Now, add and subtract this value inside the parentheses:
f(x) = (x^2 + 2x + 1 - 1) - 6
f(x) = (x + 1)^2 - 7

So, the standard form is f(x) = (x + 1)^2 - 7.

(b) Since the leading coefficient (1) is positive, the graph of this quadratic function opens upward. The vertex is at the point (-1, -7), which is the minimum point. To sketch the graph, plot the vertex and draw a parabola opening upward.

(c) The minimum value of the function is the y-coordinate of the vertex: f(x) = -7.



For more such questions on Quadratic function.

https://brainly.com/question/15567958#

#SPJ11

Calculate the following probabilities. We do NOT know the degrees of freedom. 1) Find
P(T>t 0.2

(df))
. 2) Find
P(T ​
(df))
. 3) Find
P(−t 0.1

(df) ​
(df))
. 4) Find
P(T<−t 0.21

(df))
.

Answers

The probabilities to be calculated are as follows:

a. P(T > t 0.2(df))

b. P(T(df))

c. P(-t 0.1(df)(df))

d. P(T < -t 0.21(df))

a. To calculate P(T > t 0.2(df)), we need to find the probability that a Student's t-distribution with an unknown degrees of freedom (df) exceeds the value of t 0.2. Since the degrees of freedom are unknown, we cannot determine the exact value of this probability without knowing the specific distribution being referred to.

b. To calculate P(T(df)), we need to find the probability that a Student's t-distribution with an unknown degrees of freedom (df) falls within the range of values from negative infinity to positive infinity. Since this range covers the entire distribution, the probability is equal to 1.

c. To calculate P(-t 0.1(df)(df)), we need to find the probability that a Student's t-distribution with an unknown degrees of freedom (df) is less than or equal to the negative value of t 0.1. Again, since the degrees of freedom are unknown, we cannot determine the exact value of this probability without knowing the specific distribution being referred to.

d. To calculate P(T < -t 0.21(df)), we need to find the probability that a Student's t-distribution with an unknown degrees of freedom (df) is less than the value of -t 0.21. As mentioned before, without knowing the degrees of freedom, we cannot determine the exact value of this probability.

Therefore, the probabilities cannot be calculated without knowing the specific degrees of freedom and the distribution being referred to..

To learn more about probabilities here:

brainly.com/question/30034780#

#SPJ11

8 - 2d = c 4 + 3d = 2

Answers

Answer:

d = 3

Step-by-step explanation:

Other Questions
prove that (1,1) is an element of largest order in zn1 zn2 : state the general case Tom jogs 4 1/6 miles from his house. He then jogs 5 4/5 miles farther. How many miles has Tom jogged in all? Write your answer as a mixed number in simplest form. Prepare a drive and create a FAT32 disk partition using Linux. You need the following: A Linux distribution or Linux Live CD A disk drive A method of connecting a disk drive to your workstation, such as USB, FireWire, external SATA, or internal connections, such as PATA or SATA A review of the steps in the "Preparing a Target Drive for Acquisition in Linux" section To format a drive as FAT32 in Linux, follow these steps: 1. Connect the target drive to be partitioned and formatted as FAT32 to your workstation. 2. Start your workstation, and log on or boot the Linux Live CD. 3. Follow the steps in the "Preparing a Target Disk for Acquisition in Linux" section. 4. When you've finished formatting the target drive, leave it connected for the next project. Problem #2 : Based on equivalence partitioning (black box): If the customer spends minimum $1000 for the whole year, (s)he qualifies for 2% rebate (refund). For every additional $1000 spent by the customer, rebate rate goes up by 0.1% However, max rebate rate is limited 4% Prompt and get the total purchase amount for the year from the user, and output the rebate % and the rebate amount. Determine the valid & invalid partitions based on output ? Determine the boundary values based on output ? What must be true about a gas for Boyle's and Charles' Laws to be applicable? Be non-idealBe idealHave no intermolecular forcesHave intermolecular forces Cholesterol made in the liver travels to body cells inA. Low density lipoproteins (LDLs)B. MicellesC. High density lipoproteins (HDLs)D. Chylomicrons The maximum allowable potential difference across a 220 mH inductor is 390 V . You need to raise the current through the inductor from 1.1 A to 2.5 A .What is the minimum time you should allow for changing the current?t = ______ seconds What is the spreading factor for a signal with 125 MHz bandwidth and 100 kbps data rate?a) 0.125b) 1.25c) 1,250e) 125f) None of the above. Can a normal approximation be used for a sampling distribution of sample means from a population with =70 and =12, when n=81?Answer2 PointsKeypadTablesa.No, because the standard deviation is too small.b.Yes, because the sample size is at least 30.c.Yes, because the mean is greater than 30.d.No, because the sample size is more than 30. Agenda - Professionalism9) Explain to me, using the method I showed you in class, how do you write something not so good in the agenda? Give me a verbal example. Heat waves, tornadoes and tropical storms are classed as what kind of natural hazard? NEED TO FINISH THIS 100 POINT ANSWER QUESTION BELOW!!!!!! A student performs an experiment to determine the concentration of a solution of hypochlorous acid, HOCI (Ka= 3.5x10^-8). The student starts with 25.00ml of the acid in a flask and titrates it against a standardized solution of sodium hydroxide with a concentration of 1.47M. The equivalence point is reached after the addition of 34.23 ml of NaOH. a. Write the net ionic equation for the reaction that occurs in the flask. b. what is the concentration of the HOCI? c. What would the pH of the solution in the flask be after the addition of 28.55ml of NaOH? d. The actual concentration of the HOCI is 2.25M. Quantitatively discuss whether or not each of the following errors could have caused the error in the student's results. i) the student added additional NaOH past the equivalence point. ii) The student rinsed the buret with distilled water but not with the NaOH solution before filling it with NaOH iii) The student measured the volume of acid incorrectly; instead of adding 25.00ml of HOCI, only 24.00ml was present in the flask prior to titration. choose the expression that best completes this sentence: the function f(x) = ________________ has a local minimum at the point (8,0). a) x8 b) (x8)1 c) x216x 64 d) |x8| e) (x8)13 3. How does the first-person narration help develop the story's theme(s)? pleasee helppp dont js guess or put something random pls i beg This screen displays the history of actions performed for the selected Profile, including documenting each user that performs an action. Stay Information O Changes Log O Correspondence O Notifications True or False. Grade level and age tend to be good predictors of children's development. What is the equation in point-slope form of the line passing through (-1, 3)and (1, 7)? (6 points)Oy-7= 4(x - 1)Oy-7=2(x - 1)Oy-3=2(x - 1)Oy-3-4(x + 1) In a game of pool, ball A is moving with a velocity v0 = (18 ft/s)i when it strikes balls B and C which are at rest side by side as shown. After the collision, A is observed to move with the velocity vA = (3.92 ft/s)i (4.56 ft/s)j , while B and C move in the directions shown. Determine the magnitudes of the velocities of B and C.