The second derivative test of the function is solved and the local maximum point of the function is at x = -1/2
Given data ,
Let the function be represented as A
Now , the value of A is
f ( x ) = 2x³ + 3x² - 36x + 5
Now , the first derivative of f(x) to obtain f'(x) is
f'(x) = 6x² + 6x - 36
And , the second derivative of f(x) by differentiating f'(x) with respect to x is
f''(x) = 12x + 6
Now , Set f''(x) = 0 and solve for x to find the critical points.
12x + 6 = 0
12x = -6
x = -6/12
x = -1/2
For x < -1/2: Since f''(x) = 12x + 6, and x < -1/2, the value of f''(x) will be negative, indicating that the function is concave down in this interval, and there is no local maximum point.
For x > -1/2: Since f''(x) = 12x + 6, and x > -1/2, the value of f''(x) will be positive, indicating that the function is concave up in this interval, and there may be a local maximum point.
And , If f'(x) is continuous at x = -1/2, then there must be a local maximum point at x = -1/2 since f''(x) changes sign at x = -1/2. We may verify the value of f'(x) at x = -1/2 to see if f'(x) is continuous at x = -1/2.
f'(-1/2) = 6(-1/2)² + 6(-1/2) - 36 = 3 - 3 - 36 = -36
Since f'(-1/2) = -36 is a finite function, we may infer that f'(x) is continuous at x = -1/2 and that x = -1/2 is the location of the local maximum
Hence , the local maximum is at x = -1/2
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d Points J, K, L, M have polar coordinates (6, 130°), (6, 160°), (6, 200°), (6, 250°) respectively. Show that the sum of KJM and KLM is 180°.
Okay, let's solve this step-by-step:
* Points J, K, L, M have polar coordinates:
J (6, 130°)
K (6, 160°)
L (6, 200°)
M (6, 250°)
* To find the angle between two points, we subtract their theta values (polar angle coordinates).
* Angle KJM = 160° - 130° = 30°
* Angle KLM = 250° - 200° = 50°
* Sum of angles KJM and KLM = 30° + 50° = 80°
* Since the sum of angles in any triangle is 180°, and we have 80°, the remaining angle must be 180° - 80° = 100°.
* Therefore, the sum of angles KJM and KLM is 180°.
Does this make sense? Let me know if you have any other questions!
A food processing plant has a plant has a particular problem with the processing of perishable foods .All deliveries must be processed in a single day, although there are a number of processing machines available, they are very expensive to run. A research developed the formula: Y=12x-2a-a, to describe the profit (Y in thousands) given the number of machines used (x) and number of deliveries in a day. - show that the system is uneconomical if four deliveries are made in a day - if these deliveries are made in a day,find the number of machines that would be used in order that profit is maximized Hint : find Maxima
Step-by-step explanation:
To show that the system is uneconomical if four deliveries are made in a day, we need to find the profit (Y) for x machines and 4 deliveries:
Y = 12x - 2a - a (for 4 deliveries)
Y = 12x - 3a
We know that processing all deliveries must be done in a single day, so we have:
a = 4x
Substituting this into the profit formula, we get:
Y = 12x - 3(4x)
Y = 0
This means that the profit (Y) is zero when four deliveries are made in a day, making the system uneconomical.
To find the number of machines that would be used in order for profit to be maximized for four deliveries in a day, we need to differentiate the profit formula with respect to x and set it equal to zero to find the maximum:
dY/dx = 12 - 6a = 0 (for a = 4x)
Solving for x, we get:
12 - 6(4x) = 0
12 - 24x = 0
x = 1/2
Therefore, the maximum profit would be obtained by using 1/2 of a machine (which is not physically possible, so we would round up to one machine) for processing four deliveries in a day.
I have no clue how to answer this question Will give brainliest to the correct answer +30 points
Answer:
B
Step-by-step explanation:
If a figure is enlarged by a scale factor of 1, the new figure will have the same size and shape as the original figure.
If a figure is enlarged by a negative scale factor, the new figure will be on the other side of the centre of enlargement and will be inverted (the figure appears upside down).
Therefore, if you enlarge shape X by a scale factor of -1, it will have the same size and shape as shape X, but it will be upside down.
Further information
A is a reflection across a vertical line.
C is a reflection across a horizontal line.
D is a rotation of 90° clockwise.
E is a rotation of 90° anticlockwise.
F is an enlargement of scale factor 1.
A fisherman is measuring the amount of bait he has remaining, y, in his bucket. He puts 20 pieces of bait in his bucket at the beginning of his fishing trip and uses 2 pieces every hour, x.
What is the slope for this linear relationship, and what does it mean in this situation?
−2; the amount of bait decreases by 2 pieces each hour
2; the amount of bait increases by 2 pieces each hour
−20; the amount of bait in the bucket when the fishing trip began
20; the amount of bait in the bucket when the fishing trip began
The slope for this linear relationship is -2, and it means that the amount of bait decreases by 2 pieces each hour in this situation.
The slope for this linear relationship is -2, which means that the amount of bait in the bucket decreases by 2 pieces for every hour of fishing. This slope indicates a constant rate of change in the amount of bait over time.
To understand this further, we can interpret the slope as the rate of consumption of bait per hour. Since the fisherman uses 2 pieces of bait every hour, the amount of bait in the bucket decreases by 2 pieces every hour. This linear relationship can be represented by the equation:
y = -2x + 20
where y is the amount of bait remaining in the bucket after x hours of fishing.
Therefore, the slope of -2 in this context is an important characteristic of the linear relationship between the amount of bait remaining and the time spent fishing. It tells us the rate at which the bait is being consumed, and helps the fisherman predict how much bait he will have left after a certain amount of time.
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Seven economic drivers that influence transportation costs were presented. They are distance, weight, density, stowability, handling, liability, and market.
Select a specific product, and discuss how each factor will impact the determination of a freight rate.
Let's consider the specific product of packaged food items, such as canned goods and dry goods, which are transported from a warehouse to a grocery store.
What are Seven economic drivers that influence transportation costs were presented?Distance: The distance between the warehouse and grocery store will affect the transportation cost. The farther the distance, the higher the freight rate will be.
Weight: The weight of the packaged food items will also impact the freight rate. The heavier the items, the higher the cost of transportation.
Density: The density of the packaged food items is a measure of how much space they occupy in relation to their weight. If the items are low in density, they may take up more space on a truck, and therefore, the freight rate will be higher.
Stowability: The stowability of the packaged food items refers to how easy they are to store and stack on a truck. If the items are difficult to stack, more space may be required, and the freight rate will be higher.
Handling: The handling of the packaged food items is also a factor in determining the freight rate. If the items require special handling, such as refrigeration or careful stacking, the freight rate will be higher.
Liability: Liability refers to the risk of damage or loss of the packaged food items during transportation. If the items are fragile or perishable, the freight rate will be higher to cover the higher risk of damage or loss.
Market: The market conditions, such as supply and demand, will also influence the freight rate. If there is a high demand for transportation services or a shortage of trucks, the freight rate will be higher.
Overall, the freight rate for transporting packaged food items will depend on multiple factors, including distance, weight, density, stowability, handling, liability, and market conditions. Transport companies will consider all of these factors when determining the freight rate for a particular shipment.
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fill in the blank. (enter your answer in terms of s.) ℒ{e−3t}
The value of ℒ{e−3t} is 1 / (s + 3).
Explanation: -
Given the Laplace transform of e^(-3t), you need to fill in the blank with the answer in terms of 's'.
The Laplace transform of e^(-at) is given by the formula:
ℒ{e^(-at)} = 1 / (s + a)
In your case, a = 3. Now, we can substitute this value into the formula:
ℒ{e^(-3t)} = 1 / (s + 3)
This function has a pole at s = 3, which means it is undefined at that point. However, for all other values of s, the Laplace transform is well-defined and can be used to solve differential equations that involve e^(-3t).
It's important to note that the Laplace transform is a powerful tool for solving differential equations, but it is not always necessary or convenient to use.
In some cases, it may be more efficient to solve the differential equation directly using other methods. However, when the Laplace transform is applicable, it can greatly simplify the solution process and provide valuable insights into the behavior of the system.
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From a group of 13 men, 6 women, 2 boys, and 4 girls, (a) In how many ways can a man, a woman, a boy, and a girl be selected? (b) In how many ways can a man or a girl be selected? (c) In how many ways can one person be selected?
(a) A man, a woman, a boy, and a girl can be selected in 312 ways.
(b) A man or a girl can be selected in 57 ways.
(c) One person can be selected in 25 ways.
(a) To select a man, a woman, a boy, and a girl, use the multiplication principle. There are 13 men, 6 women, 2 boys, and 4 girls, so the number of ways is 13 * 6 * 2 * 4 = 312 ways.
(b) To select a man or a girl, there are 13 men and 4 girls, so the number of ways is 13 + 4 = 17 ways.
(c) To select one person, there are a total of 13 men + 6 women + 2 boys + 4 girls = 25 people, so there are 25 ways to choose one person.
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let n k denote the number of partitions of n distinct objects into k nonempty subsets. show that n 1 k = k n k n k−1
n k denote the number of partitions of n distinct objects into k nonempty subsets which show that n 1 k = k n k n k−1
How to show that n1k = knk nk-1?To show that n1k = knk nk-1, we can use a combinatorial argument.
First, we note that n1k represents the number of ways to partition n distinct objects into k nonempty subsets, with no regard for the order of the subsets.
On the other hand, knk represents the number of ways to partition n distinct objects into k nonempty subsets, where the order of the subsets matters.
We can think of this as first choosing a subset for object 1 from the k subsets available, then choosing a subset for object 2 from the remaining k-1 subsets, and so on. The total number of ways to do this is k * (k-1) * ... * 2 * 1 = k!.
Now, let's consider the following process for constructing a partition of n objects into k nonempty subsets:
Choose one of the k subsets to be the first subset, and choose n objects to put in that subset. There are n choose k ways to do this.Choose one of the remaining k-1 subsets to be the second subset, and choose n-k objects to put in that subset. There are (n-k) choose (k-1) ways to do this.Continue in this way, choosing one subset at a time and selecting the appropriate number of objects, until all k subsets have been formed.The total number of ways to do this is the product of the number of choices at each step, which is:
n choose k * (n-k) choose (k-1) * (n-2k+2) choose (k-2) * ... * k choose 1
We can simplify this expression using the identity:
m choose r = m! / (r! * (m-r)!)
Substituting this identity into the product above and simplifying, we obtain:
n1k = n! / [k! * (n-k)!] = knk / k = knk (n-k)! / k! = knk nk-1
Therefore, we have shown that n1k = knk nk-1.
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Shelly measures the dimensions of her bedroom so she can buy new carpet..
Which set of dimensions for Shelly's carpet is most reasonable?
A
B
C
D
12 feet by 10 feet
60 inches by 36 inches
20 meters by 18 meters
100 centimeters by 80 centimeters
Answer:
12 feet × 10 feet
Step-by-step explanation:
12 feet × 10 feet is the size of a modest bedroom.
60in × 36in is only 5×3 feet, more like a closet.
20×18m is around 60×54feet something like a whole studio apartment or 1-bedroom apartment.
100×80cm is like 3 feet by lessthan 3 feet like a doormat size or maybe a coat closet.
How tall is the school?
2. Nemani buys a TV on hire purchase. The cash price is $1250. He pays $450 deposit and 12 monthly instalments of $95.How much interest is paid by Nemani.
Answer:
Nemani has paid $1250 for a TV on hire purchase. The cash price was $1250, so the total cost to Nemani was $1300. Nemani has paid $450 deposit and 12 monthly instalments of $95, for a total of $1445.
So, Nemani has paid an interest rate of 10% on his total payment.
I need the answer pls someone help
The surface area of the cylinder given is approximately calculated as: 960.84 square meters.
What is the Surface Area of a Cylinder?The surface area of a cylinder can be found by adding the areas of its curved surface (lateral area) and its two circular bases.
If the cylinder has a radius of r and a height of h:
Surface Area = 2πr(h + r)
Given the following:
Radius (r) = 9 m
Height (h) = 8 m
π = 3.14
Substitute:
Surface area of the cylinder = 2 * 3.14 * 9(8 + 9)
= 56.52(17)
= 960.84 square meters.
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1. The One Way Repeated Measures ANOVA is used when you have a quantitative DV and an IV with three or more levels that is within subjects in nature.
A. True
B. False
True, The One Way Repeated Measures ANOVA is used when you have a quantitative DV and an IV with three or more levels that is within subjects in nature.
The statement is true and explained as follows:
The One Way Repeated Measures ANOVA is a statistical technique that is used to analyze data from experiments where the same participants are exposed to multiple levels of an independent variable (IV). This type of experimental design is known as a within-subjects design, as opposed to a between-subjects design, where different participants are used for each level of the IV.
One of the main advantages of using a within-subjects design is that it allows for more efficient use of participants. By exposing each participant to all levels of the IV, the variability between participants is reduced, which in turn increases the power of the statistical analysis.
The One Way Repeated Measures ANOVA is specifically used when the dependent variable (DV) is quantitative, meaning that it can be measured using numerical values. Additionally, the IV must have three or more levels, meaning that there are at least three different conditions that participants are exposed to.
The basic idea behind the One Way Repeated Measures ANOVA is to compare the mean scores of the DV across the different levels of the IV while taking into account the fact that the same participants are being used for each level. This is done by calculating the within-subjects variability, which is the variability in the scores of the DV that is due to individual differences between participants. The within-subjects variability is then compared to the between-subjects variability, which is the variability in the scores of the DV that is due to the different levels of the IV.
The statistical output from the One Way Repeated Measures ANOVA includes an F-test, which compares the within-subjects variability to the between-subjects variability. If the F-test is statistically significant, this indicates that there is a significant difference between at least two of the levels of the IV.
In conclusion, the One Way Repeated Measures ANOVA is a useful statistical technique for analyzing data from within-subjects experiments with a quantitative DV and an IV with three or more levels. By taking into account the fact that the same participants are used for each level, the One Way Repeated Measures ANOVA can provide a more efficient and powerful analysis of experimental data.
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1. The solution of the differential equation y'-y = x
2. The differential equation y' = sqrt(x+y+1) -1 has the solution
Given
1. y'-y = x
2. y' = sqrt(x+y+1) -1
Solution
To solve the differential equation y' - y = x, we can use the method of integrating factors.First, we must rewrite the equation as follows:
y' - y = f(x)
where f(x) = x. Then, we can multiply both sides by the integrating factor e^(-x):
e^(-x) y' - e^(-x) y = xe^(-x)
The product rule can be used to rewrite the left side:
(e^(-x) y)' = xe^(-x)
When we integrate both sides in relation to x, we get:
e^(-x) y = ∫xe^(-x) dx + C
where C is the constant of integration. The integral on the right-hand side can be evaluated using integration by parts:
∫xe^(-x) dx = -xe^(-x) - ∫e^(-x) dx = -xe^(-x) - e^(-x) + D
where D is another constant of integration. As a result, the differential equation's solution is:
y = e^x (∫xe^(-x) dx + C) + De^x
Substituting the integral back in, we get:
y = x - 1 + Ce^x + De^x
where C and D are constants.
To solve the differential equation y' = sqrt(x+y+1) -1, we can use separation of variables. First, we can add 1 to both sides of the equation:
y' + 1 = sqrt(x+y+1)
Then, we can square both sides:
(y' + 1)^2 = x+y+1
Expanding the left-hand side and simplifying, we get:
y'^2 + 2y' + 1 = x+y+1
Rearranging the terms, we get:
y'^2 + 2y' - y = x
This is a nonlinear first-order differential equation, which cannot be solved using separation of variables or integrating factors. However, we can recognize it as a Bernoulli equation, which can be transformed into a linear differential equation by making the substitution:
u = y' - 1
Then, we have:
y' = u + 1
y'' = u''
We get by substituting these expressions into the original equation and simplifying:
(u+1)^2 - (u+1) - y = x
u^2 + u - y - x = 0
This is a quadratic equation in u, which can be solved using the quadratic formula:
u = (-1 ± sqrt(1 + 4y + 4x))/2
Substituting back the expression for u, we get:
y' = (-1 ± sqrt(1 + 4y + 4x))/2 + 1
y' = (-1 ± sqrt(1 + 4y + 4x))/2 + 2/2
y' = (-1 ± sqrt(1 + 4y + 4x) + 2)/2
y' = (sqrt(1 + 4y + 4x) - 1)/2
This is the solution to the differential equation.
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let s be the subspace of R^3 spanned by e1 and e2. for each linear operator L in exercise 17 find L (S)
First, let's recall the definition of the subspace spanned by e1 and e2. This means that s is the set of all linear combinations of e1 and e2. In other words, any vector in s can be written as a scalar multiple of e1 plus a scalar multiple of e2.
Now, to find L(S) for each linear operator L in exercise 17, we simply need to apply L to every vector in s. Since s is spanned by e1 and e2, we can express any vector in s as a linear combination of e1 and e2:
v = ae1 + be2 where a and b are scalars. Then, we can apply L to v: L(v) = L(ae1 + be2)
Since L is a linear operator, we know that it satisfies the properties of linearity: L(x + y) = L(x) + L(y) L(cx) = cL(x) for any vectors x and y and any scalar c.
Therefore, we can apply these properties to L(ae1 + be2): L(v) = L(ae1) + L(be2) = aL(e1) + bL(e2) where we have used the fact that e1 and e2 are vectors in R^3 and therefore can be operated on by L.
So, to summarize: - We start with a vector v in s, which can be expressed as v = ae1 + be2
We apply L to v, using the linearity properties of L: L(v) = L(ae1 + be2) = L(ae1) + L(be2) = aL(e1) + bL(e2)
Therefore, L(S) is the set of all vectors that can be expressed in the form aL(e1) + bL(e2), where a and b are scalars.
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find the area under the standard normal curve to the left of z=−1.51z=−1.51 and to the right of z=1.4z=1.4. round your answer to four decimal places, if necessary
The area under the given standard normal curve is approximately 0.1463
How to find the area under the standard normal curve?To find the area under the standard normal curve to the left of z=-1.51 and to the right of z=1.4, follow these steps:
1. Look up the z-scores in the standard normal table (also known as the z-table).
2. Find the area associated with z=-1.51 and z=1.4.
3. Add the areas together.
Using the z-table:
- For z=-1.51, the area to the left is 0.0655.
- For z=1.4, the area to the right is 1 - 0.9192 = 0.0808.
Now, add the areas together:
0.0655 + 0.0808 = 0.1463
So, the area under the standard normal curve to the left of z=-1.51 and to the right of z=1.4 is approximately 0.1463, rounded to four decimal places.
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(PLEASE DO NOT USE CHAT GPT)You are going to calculate what speed the kayaker 's are paddling, if they stay at a constant rate the entire trip, while kayaking in Humboldt bay. key information:
River current: 3 miles per hour
Trip distance: 2 miles (1 mile up, 1 mile back)
Total time of the trip: 3 hours 20 minutes
1) Label variables and create a table
2) Write an equation to model the problem
3) Solve the equation. Provide supporting work and detail
4) Explain the results
The solutions are given below.
1) Variables:
- Speed of the kayaker (unknown, let's call it x)
- Speed of the current = 3 mph (given)
- Distance kayaked one way = 1 mile (given)
- Total distance covered (round trip) = 2 miles (given)
- Total time of the trip = 3 hours 20 minutes = 3.33 hours (converted to hours for convenience)
Table:
Photo attached.
2) The equation to model the problem is:
distance = rate × time
Using this equation for each kayaking portion, we get:
1 = (x - 3) t
1 = (x + 3) t
We also know that the total time of the trip is 3.33 hours:
t + t = 3.33
2t = 3.33
t = 1.665
3) Now we can solve for x by substituting t = 1.665 in either of the above equations:
1 = (x - 3) (1.665)
x - 3 = 0.599
x = 3.599
Thus, the kayakers are paddling at a speed of 3.599 miles per hour.
4) The kayakers are paddling at a speed of 3.599 miles per hour. This solution is obtained by calculating the average speed of the kayakers over the entire trip, taking into account the opposing speed of the river current. The kayakers are traveling faster downstream (with the current) than upstream (against the current).
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UNSCRAMBLE THE WORDS
OLTONUSI
QNIEUOAT
EDVIDI
VOET
F
Answer:
SOLUTION
EQUATION
DIVIDE
VOTE
F
what is the general solution to the differential equation dydx=4x3 3x2 13y2 ?
The answer of the given question based on differential equation is ,
y² = (3/13)(C - x⁴)
What is Equation?An equation is mathematical statement that indicates equality of two expressions. It consists of variables, constants, and mathematical operations like addition, subtraction, multiplication, division, exponentiation, etc. An equation can be written in different forms depending on the type of equation, like linear, quadratic, polynomial, trigonometric, exponential, or logarithmic.
The given differential equation is:
dy/dx = 4x³/(3x² + 13y²)
To find general solution, we need to separate variables and integrate both sides:
(3x² + 13y²) dy = 4x³ dx
Integrating both sides:
∫(3x² + 13y²) dy = ∫4x³ dx
Simplifying and solving the integrals:
x⁴ + (13/3)y³ = x⁴ + C
where C is the constant of integration.
Therefore, the general solution to the given differential equation is:
y² = (3/13)(C - x⁴)
where C is an arbitrary constant.
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given the formula[ A B] [ I 0 ] = [ 0 I]C 0 X Y Z 0which matrix or matrices must be invertible?B and YYXB and XB
Tthe matrices B and Y must be invertible for the given formula to hold true. As for the specific choices given, both options of XB and YYXB include an invertible matrix B, so they satisfy the requirement.
In order for the given formula to hold true, both matrices [A B] and [I 0] must be invertible. This is because the product of two invertible matrices is also invertible.
However, based on the given formula, we can also see that matrix Y must be invertible. This is because if Y is not invertible, then the matrix [0 I] would not be invertible, and therefore the entire equation would not hold true.
the matrices B and Y must be invertible for the given formula to hold true.
As for the specific choices given, both options of XB and YYXB include an invertible matrix B, so they satisfy the requirement.
Based on the given formula:
[ A B ] [ I 0 ] = [ 0 I ]
[ C 0 ] [ X Y ] [ Z 0 ]
Let's analyze each part of the matrix equation:
1. [ A B ] [ I 0 ] = [ 0 I ]
2. [ C 0 ] [ X Y ] = [ Z 0 ]
From equation (1), we have AI + BX = 0 and BI = I, which means B is invertible. From equation (2), we have CX = Z and 0Y = 0, which means X is invertible.
Therefore, the matrices B and X must be invertible. Your answer is "B and X".
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B 0 Let A= where B and C are square. Show that A is invertible if and only if both B and C are invertible. ос 0 Another way to write A-1 is A-1 = *-[:]"[23 -1 Combining the expression for A from above with this expression gives the following equation. 1 D 0 B 0 OG 0 Cº1 This proves that A is invertible only if B and C are invertible. Now prove the converse of this statement. Suppose that B and C are invertible. Compute AA-1 1 во B 0 -1 = АА ос 0 C-1 I 0 0 I 0
A is invertible if and only if both B and C are invertible.
To prove the converse statement, we need to show that if both B and C are invertible, then A is also invertible.
Assume that B and C are invertible. We need to find the inverse of A.
Let D = BC. Since B and C are invertible, D is also invertible. Moreover, we have:
A = [D 0; 0 I]
where 0 is a square matrix of the same size as B and I is the identity matrix of the same size as C.
To find the inverse of A, we need to find a matrix A-1 such that:
AA-1 = A-1A = I
Let:
A-1 = [E F; G H]
where E, F, G, and H are matrices of appropriate sizes.
Then we have:
AA-1 = [D 0; 0 I][E F; G H] = [DE GF; DG+HI]
and
A-1A = [E F; G H][D 0; 0 I] = [ED FG; GH+I]
Setting these equal to I and equating corresponding entries, we get:
DE = ED = I (since D is invertible)
GF = 0
DG + HI = 0
ED = DE = I (since D is invertible)
FG = 0
GH + I = 0
From the first equation, we have E = D-1. From the second equation, we have F = 0. From the third equation, we have G = -D-1H. Substituting these values into the fourth and sixth equations, we get:
-HD-1H + I = 0
which implies that HD-1H = D-1.
Since D = BC and both B and C are invertible, we have D-1 = C-1B-1. Substituting this into the above equation, we get:
HC-1B-1H = I
which implies that H(BH)-1(C-1H)-1 = I. Since B and C are invertible, BH and C-1H are also invertible. Therefore, H is invertible and we have:
A-1 = [D-1 0; -D-1HC-1B-1 D-1]
Thus, A is invertible if and only if both B and C are invertible.
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etermine whether the following equation is separable. If so, solve the given initial value problem. y'(t) 4y e. y(0) = 1 Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. The equation is separable. The solution to the initial value problem is y(t) e4e (Type an exact answer in terms of e.) B. The equation is not separable.
The equation is separable. The solution to the initial value problem is y(t) = e^(4 * e^t) , therefore option A is correct.
To determine whether the given equation is separable and solve the initial value problem:
We will follow these steps:
STEP 1: Identify the given differential equation: y'(t) = 4y * e^t
STEP 2: Rewrite the equation in terms of dy/dt: dy/dt = 4y * e^t
STEP 3:Rearrange the terms to separate variables: (1/y) dy = 4 * e^t dt
STEP 4:Integrate both sides: ∫(1/y) dy = ∫4 * e^t dt
STEP 5:Evaluate the integrals: ln|y| = 4 * e^t + C1 (we can drop the absolute value since y > 0)
STEP 6:Solve for y: y = e^(4 * e^t + C1)
STEP 7:Apply the initial condition y(0) = 1: 1 = e^(4 * e^0 + C1)
STEP 8:Solve for C1: C1 = 0
STEP 9:Substitute C1 back into the solution: y(t) = e^(4 * e^t)
The equation is separable. The solution to the initial value problem is y(t) = e^(4 * e^t) (Type an exact answer in terms of e).
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What expression is equivalent to the expression -3.5 (2- 1.5n) - 4.5n??
Answer:
-7+0.75n
I would give an explanation but im bad at explaining
Find the solution of the initial value problem
y′′ − y = 0 y(0) =
5
4, y′ (0) = −
3
4
Plot the solution for 0 ≤ t ≤ 2 and determine its minimum value.
The characteristic equation for the differential equation y′′ − y = 0 is r^2 - 1 = 0. This has roots r = ±1. Therefore, the general solution to the differential equation is y(t) = c1 e^t + c2 e^(-t).
Using the initial conditions, we can solve for the values of c1 and c2:
y(0) = 5/4 = c1 + c2
y'(0) = -3/4 = c1 - c2
Solving these equations simultaneously, we get c1 = 1/2 and c2 = 3/4. Therefore, the solution to the initial value problem is:
y(t) = 1/2 e^t + 3/4 e^(-t)
To find the minimum value of the solution, we can take the derivative of y(t) and set it equal to 0:
y'(t) = 1/2 e^t - 3/4 e^(-t)
y'(t) = 0 when e^t = (3/2) e^(-t)
e^(2t) = 3/2
t = ln(sqrt(3/2))
Substituting this value of t back into the original equation, we get the minimum value of the solution:
y(ln(sqrt(3/2))) = 1/2 e^(ln(sqrt(3/2))) + 3/4 e^(-ln(sqrt(3/2)))
y(ln(sqrt(3/2))) = sqrt(3)/4 + 3/(4sqrt(3))
y(ln(sqrt(3/2))) = (4sqrt(3) + 3)/(4sqrt(3))
Therefore, the minimum value of the solution is (4sqrt(3) + 3)/(4sqrt(3)) which is approximately 1.068.
To plot the solution for 0 ≤ t ≤ 2, we can use a graphing calculator or software to graph y(t) = 1/2 e^t + 3/4 e^(-t) and then set the viewing window to show the interval [0, 2].
Additional Algo 4-9 Add N workers Shirts are made in a process with two resources (workers in each resource work independently). The processing time (per worker) of the first resource is 500 seconds. The processing time (per worker) of the second resource is 2,800 seconds. The first resource has 2 workers and the second resource has 10 workers. Assume 2 workers are added to the process and all of them are assigned to one of the resources. Instruction: What would be the capacity of this process? shirts per minute
The capacity of the process is approximately 29.79 shirts per minute.
To calculate the capacity of the process, we first need to find the total processing time of the current process.
For the first resource, with 2 workers and a processing time of 500 seconds per worker, the total processing time is:
500 seconds/worker * 2 workers = 1000 seconds
For the second resource, with 10 workers and a processing time of 2800 seconds per worker, the total processing time is:
2800 seconds/worker * 10 workers = 28000 seconds
Therefore, the total processing time for the current process is:
1000 seconds + 28000 seconds = 29000 seconds
To find the capacity of the process, we can use the formula:
Capacity = 3600 seconds/hour / Total Processing Time (in seconds) * Number of resources
In this case, we have 2 resources, so:
Capacity = 3600 seconds/hour / 29000 seconds * 2 resources
Capacity = 0.2483 shirts per second * 2 resources
Capacity = 0.4966 shirts per second
To convert to shirts per minute, we can multiply by 60:
Capacity = 0.4966 shirts per second * 60 seconds/minute
Capacity = 29.79 shirts per minute
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the following argument purports to show that every real number in the interval [0,00) is rational: "Suppose toward a contradiction that there exists a real number in the interval [0,00) that is not rational. So the set A:= {2 € (0,0): 2¢} is non-empty. Then by the Wellordering Principle, there is a smallest element of A, which we'll denote by 7. Now 0, being an integer, is also rational, so i cannot be 0. Hence, since ī> 0 by virtue of its membership in A, it follows that I >0. Let z:=/2, and note that 0 0). Since z <ī and ī is the smallest element of A, it follows that z ¢ A. Since z is a real number in the interval [0, 0), and 2 & A, it follows from the definition of the set A that z is rational. Then I = 2z is rational too, since the rationals are closed under multiplication. Hence i is rational, which contradicts the fact that I e A." Briefly in one sentence) explain what the MAJOR problem is in the passage above. Don't just say that there are non-rational real numbers or give an example of a non-rational real number (we all know that "every real number in [0,00) is rational" is false; I want you to point out exactly where the purported proof of it goes awry).
The major problem in the passage is that it assumes the existence of a smallest element in the set A, which is not true for all non-empty subsets of the real numbers .a real number is a number that can be used to measure a continuous one-dimensional quantity such as a distance, duration or temperature. Here, continuous means that pairs of values can have arbitrarily small differences. Every real number can be almost uniquely represented by an infinite decimal expansion.
The real numbers are fundamental in calculus (and more generally in all mathematics), in particular by their role in the classical definitions of limits, continuity and derivatives. Real intervals play an important role in the theory of integration, because they are the simplest sets whose "length" (or "measure" or "size") is easy to define. The concept of measure can then be extended to more complicated sets of real numbers, leading to the Borel measure and eventually to the Lebesgue measure.
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on wednesday, a student reads 812 pages of a book. on thursday, the student reads 3 times as many pages of the book.how many pages does the student read on thursday?
Therefore, the student reads 2,436 pages on Thursday by the given equation.
According to the given information, the student reads three times as many pages on Thursday as on Wednesday. Let's say that the number of pages read on Wednesday is represented by the variable w. Then, we can write the equation:
Pages on Thursday = 3 * Pages on Wednesday
In this equation, we know that Pages on Wednesday = w. So we can substitute w into the equation and get:
Pages on Thursday = 3w
We are also given that on Wednesday, the student read 812 pages. So we can substitute 812 for w and get:
Pages on Thursday = 3 * 812
Simplifying, we get:
Pages on Thursday = 2,436
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what are the slope and y intercept of the linear function graphed to the left
The slope and y-intercept of the linear function graphed include the following:
slope = -1/2.
y-intercept = 1.
What is the slope-intercept form?In Mathematics and Geometry, the slope-intercept form of the equation of a straight line is given by this mathematical expression;
y = mx + c
Where:
m represents the slope or rate of change.x and y are the points.c represents the y-intercept or initial value.First of all, we would determine the slope of this line;
Slope (m) = (y₂ - y₁)/(x₂ - x₁)
Slope (m) = (0 - 1)/(0 - 2)
Slope (m) = -1/2
For the y-intercept, we have:
y-intercept = 1.
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Missing information:
The question is incomplete and the complete question is shown in the attached picture.
no matter what the resource allocation is, area a will always have the highest resource availability.
The given statement "no matter what the resource allocation is, area A will always have the highest resource availability," is not essentially true.
The term "area" generally refers to a specific region or part of a larger space. In the context of your question, area A represents a particular zone with resources allocated to it. Resource availability refers to the quantity and accessibility of resources in a given area.
To claim that area A will always have the highest resource availability regardless of resource allocation, it implies that there are factors inherent to area A that consistently make it the most resource-rich zone. This could be due to natural resource distribution, infrastructure, or other variables that ensure area A maintains the highest resource availability.
However, without additional information about area A and the specific resources in question, it is difficult to definitively state that area A will always have the highest resource availability.
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40% of the students on the museum trip love the museum. If there 240 students on the field trip, how many love the museum?
If 40% of the students on the museum trip love the museum, then the remaining 60% don't love the museum. To find out how many students love the museum, we can multiply the total number of students by the percentage who love the museum:
Number of students who love the museum = 40% of 240 students
= 0.4 x 240
= 96 students
Therefore, 96 students on the field trip love the museum.