Recall that an angle making a full rotation measures 360 degrees or 2 radians. a. If an angle has a measure of 110 degrees, what is the measure of that angle in radians? radians Preview b. Write a formula that expresses the radian angle measure of an angle, in terms of the degree measure of that angle

Therefore, H(t) is increasing on the intervals (-∞, -1/[tex]\sqrt7[/tex]) and ([tex]1/\sqrt7[/tex], ∞) and decreasing on the interval ([tex]-1/\sqrt7[/tex], [tex]1/\sqrt7[/tex]).and There are no local or absolute maximum values for H(t).

To find the intervals on which the function H(t) is increasing or decreasing, we need to take the first derivative of H(t) and find its critical points.

a.) First derivative of H(t):

[tex]H'(t) = 12t^11 - 84/7t^13[/tex]

[tex]= 12t^11(1 - 7t^2)/7t^2[/tex]

The critical points are where H'(t) = 0 or H'(t) is undefined.

So, setting H'(t) = 0, we get:

[tex]12t^11(1 - 7t^2)/7t^2 = 0[/tex]

[tex]t = 0[/tex] or t = ±([tex]1/\sqrt7[/tex])

H'(t) is undefined at t = 0.

Now, we can use the first derivative test to determine the intervals on which H(t) is increasing or decreasing. We can do this by choosing test points between the critical points and checking whether the derivative is positive or negative at those points.

Test point: -1

[tex]H'(-1) = 12(-1)^11(1 - 7(-1)^2)/7(-1)^2 = -12/7 < 0[/tex]

Test point: (-1/√7)

[tex]H'(-1/\sqrt7) = 12(-1/\sqrt7)^11(1 - 7(-1/\sqrt7)^2)/7(-1/\sqrt7)^2 = 12/7\sqrt7 > 0[/tex]

Test point: (1/√7)

[tex]H'(1/\sqrt7) = 12(1/\sqrt7)^11(1 - 7(1/\sqrt7)^2)/7(1/\sqrt7)^2 = -12/7\sqrt7 < 0[/tex]

Test point: 1

[tex]H'(1) = 12(1)^11(1 - 7(1)^2)/7(1)^2 = 5/7 > 0[/tex]

Therefore, H(t) is increasing on the intervals (-∞, -1/√7) and (1/√7, ∞) and decreasing on the interval (-1/√7, 1/√7).

b.) To find the local and absolute extreme values of H(t), we need to check the critical points and the endpoints of the intervals.

Critical points:

[tex]H(-1/\sqrt7) \approx -0.3497[/tex]

[tex]H(0) = 0[/tex]

[tex]H(1/\sqrt7) \approx-0.3497[/tex]

Endpoints:

H (-∞) = -∞

H (∞) = ∞

Since H (-∞) is negative and H (∞) is positive, there must be a global minimum at some point between -1/√7 and 1/√7. The function is symmetric about the y-axis, so the global minimum occurs at t = 0, which is also a local minimum. Therefore, the absolute minimum of H(t) is 0, which occurs at t = 0.

There are no local or absolute maximum values for H(t).

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Therefore, based on the information given, it seems that Bus Company A is doing slightly better in terms of on-time performance.

To determine which bus company seems to be doing better, we need to compare their on-time performance.

Bus Company A claims that it is typically on time 95% of the time. This means that out of 100 trips, it expects to be on time for 95 of them.

On the other hand, Bus Company B has a record of being on time 47 days out of the 50 days that it operates. This means that its on-time performance is:

47/50 = 0.94 or 94%

Comparing the two percentages,

we can see that Bus Company A claims to have a higher on-time performance (95%) than Bus Company B's actual on-time performance (94%).  Bus Company B's on-time performance is based on actual data from 50 days of operation.

Therefore, based on the information given, it seems that Bus Company A is doing slightly better in terms of on-time performance.

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Complete question:

Bus Company A claims that it is typically on time 95% of the time While Bus

Company B has a record of being on time 47 days out of the 50 days that it

operates. Which bus company seems to be doing better?

The probability that X will be at least 2 is 0.5940 and the probability that X will be between 2 and 4 (inclusive) is 0.3010.

The Poisson distribution is given by the formula:

[tex]P(X = k) = (e^{(-\lambda)} * \lambda ^k) / k![/tex]

where λ is the expected value or mean of the distribution.

In this case, we are given that E(X) = 2.4, so λ = 2.4.

Using a Poisson probability calculator, we can find:

P(X > 2) = 1 - P(X ≤ 2) = 1 - (P(X = 0) + P(X = 1) + P(X = 2))

= [tex]1 - [(e^{(-2.4)} * 2.4^0) / 0! + (e^{(-2.4)} * 2.4^1) / 1! + (e^{(-2.4)} * 2.4^2) / 2!][/tex]

= [tex]1 - [(e^{(-2.4)} * 1) + (e^{(-2.4)} * 2.4) + (e^{(-2.4)} * 2.4^2 / 2)][/tex]

= 1 - 0.4060

= 0.5940 (rounded to four decimal places)

Therefore, the probability that X will be at least 2 is 0.5940.

Using a Poisson probability calculator, we can find:

P(2 < X < 4) = P(X = 3) + P(X = 4)

= [tex](e^{(-2.4)} * 2.4^3 / 3!) + (e^{(-2.4)} * 2.4^4 / 4!)[/tex]

= 0.2229 + 0.0781

= 0.3010 (rounded to four decimal places)

Therefore, the probability that X will be between 2 and 4 (inclusive) is 0.3010.

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In this case, we can use a standard normal distribution table or a calculator to find that the value for P75 is approximately 12.1.

Here is a normal bell curve for a normal distribution with mean (μ) of 8 and standard deviation (σ) of 5:

The horizontal axis represents the range of possible values for the variable X, and the vertical axis represents the probability density of each value occurring.

The curve is symmetrical around the mean (μ=8), which is located at the peak of the curve. The standard deviation (σ=5) determines the width of the curve, with wider curves having larger standard deviations.

The shaded area under the curve represents the probability of a value falling within a certain range. For example, the area under the curve between X=3 and X=13 represents the probability of a value falling within 1 standard deviation of the mean, which is approximately 68%.

The percentile of a certain value can also be determined from the normal distribution. For example, the 75th percentile (represented as P75) is the value that separates the lowest 75% of values from the highest 25%. In this case, we can use a standard normal distribution table or a calculator to find that the value for P75 is approximately 12.1.

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The margin of error for a 95% confidence interval estimate for the proportion of all students with cell phones is approximately 0.0932.

To find the margin of error for a 95% confidence interval estimate for the proportion of all students with cell phones, we can use the formula:

Margin of Error = Z* * sqrt(p*(1-p)/n)

where:
Z* is the z-score corresponding to the desired level of confidence (in this case, 1.96 for 95% confidence)
p is the sample proportion (55/75 = 0.7333)
n is the sample size (75)

Plugging in the values, we get:

Margin of Error = 1.96 * sqrt(0.7333*(1-0.7333)/75)
Margin of Error ≈ 0.0932

Therefore, the margin of error for a 95% confidence interval estimate for the proportion of all students with cell phones is approximately 0.0932.

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The probability that Diesel will win her 6th game on the 18th game is approximately 0.000568, or 0.0568%.

The probability that Diesel will win her 6th game on the 18th game is calculated using the binomial distribution formula.

Let's define the following terms:
- n = number of trials (games played) = 18
- k = number of successes (games won by Diesel) = 6
- p = probability of success (Diesel winning a game) = 1/4
- q = probability of failure (Daisy winning a game) = 1 - p = 3/4

The formula for the probability of exactly k successes in n trials is:

P(k) = (n choose k) * p^k * q^(n-k)

where (n choose k) is the binomial coefficient, which represents the number of ways to choose k successes out of n trials. It can be calculated as:

(n choose k) = n! / (k! * (n-k)!)

Plugging in the values, we get:

P(6) = (18 choose 6) * (1/4)^6 * (3/4)^12
= 18! / (6! * 12!) * (1/4)^6 * (3/4)^12
= 18564 * 0.00000244 * 0.0122
= 0.000568

Therefore, the probability that Diesel will win her 6th game on the 18th game is approximately 0.000568, or 0.0568%.

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After unit conversion , the statement is 30 ounces < 2 pounds.

What is unit conversion?

The same feature is expressed in a different unit of measurement through a unit conversion. Time can be stated in minutes rather than hours, and distance can be expressed in kilometres rather than miles, or in feet rather than any other unit of length.

Here the given is 32 ounces and 2 pounds,

We know  that , if two values in same measurement then we can easily compare them.

Here we know that 1 pound  = 16 ounces. Then

=> 2 pounds = 16*2 = 32 ounces.

Hence the statement is 30 ounces < 2 pounds.

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The line intersects the xy-plane (z=0) and the xz-plane (y=0) at the point (0,0,0) in both cases.

To find the point of intersection of the line l(t) = (5/3t, 7/8t, -4t) with the xy-plane (z=0), we can putting z=0 in the equation of the line to get

5/3t = x

7/8t = y

0 = z

Solving for t, we get

t = 0 (which corresponds to the point (0,0,0))

Substituting t=0 in the equations of the line, we get the point of intersection as

(5/3(0), 7/8(0), -4(0)) = (0, 0, 0)

Therefore, the line intersects the xy-plane at the point (0, 0, 0).

To find the point of intersection of the line with the xz-plane (y=0), we can substitute y=0 in the equation of the line to get

5/3t = x

0 = y

-4t = z

Solving for t

t = 0 (which corresponds to the point (0,0,0))

Putting t=0 in the equations of the line, we get the point of intersection as

(5/3(0), 7/8(0), -4(0)) = (0, 0, 0)

Therefore, the line intersects the xz-plane at the point (0, 0, 0).

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In economics, a utility function is a mathematical function that assigns a numerical value to the satisfaction or utility that a consumer derives from consuming a particular combination of goods and services.

First, let's correct the utility function you provided. I believe it should be:
u(x1, x2) = x1^2 + x2^2

Now, let's find the marginal utility functions with respect to x1 and x2. The marginal utility is the derivative of the utility function with respect to the corresponding variable.

(a) Marginal utility function with respect to x1:
MU_x1 = d(u(x1, x2))/dx1 = 2x1

Marginal utility function with respect to x2:
MU_x2 = d(u(x1, x2))/dx2 = 2x2

(b) The significance of this utility function is that it exhibits diminishing marginal utility for both x1 and x2. As the consumption of x1 or x2 increases, the additional utility gained from consuming more units of x1 or x2 decreases.

This is evident in the marginal utility functions MU_x1 and MU_x2, where the derivatives are constant values (2x1 and 2x2), indicating a linear relationship.

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To show that if ab = ac and a is nonsingular, then the cancellation law holds, meaning b = c, we can follow these steps:

1. Start with the given equation: ab = ac.
2. We know that a is nonsingular, which means it has an inverse, denoted by a^(-1).
3. Multiply both sides of the equation by the inverse of a on the left: a^(-1)(ab) = a^(-1)(ac).
4. Use the associative property of matrix multiplication: (a^(-1)a)b = (a^(-1)a)c.
5. The product of a matrix and its inverse is the identity matrix (I): Ib = Ic.
6. The identity matrix doesn't change the matrix when multiplied: b = c.

Thus, by using the given terms "nonsingular," "cancellation law," and "b = c," we have shown that if ab = ac and a is nonsingular, then the cancellation law holds, and b = c.

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Answer: 120

Step-by-step explanation:

The factorial function multiplies all numbers below that number going to 1. For example,

   2! = 2 * 1 = 2

   3! = 3 * 2 * 1 = 6
   4! = 4 * 3 * 2 * 1 = 24

Thus, 5! would be 5 * 4 * 3 * 2 * 1 = 120.

Answer: Option 1

Step-by-step explanation:

    In a function, each input can only have one output. This rules out option 2 and option 4.

    Next, a graphed function must pass the vertical line test. This rules out option 3.

    This leaves us with option 1, the correct answer option. Option one is a function.

Answer:

9÷ 1/2 = 9 • 2/1 = 18 bags of trail mix

Step-by-step explanation:

You can solve this problem using division.  Since there are 9 pounds of trail mix to divide up, you would start with 9 pounds and divide it by 1/2 pound to find the number of bags you could make (use the reciprocal of the divisor 1/2)

The given summation can be expanded as a series of terms, where each term is the product of two factors: one factor consists of the index variable, i or k+1, and the factorial i! or (k+1)!. The other factor consists of the sum of the first i or k terms of the corresponding factorial sequence, i.e., 1(1!), 2(2!), 3(3!), and so on.

Because i in the first term runs from 1 to k, the total is made up of the first k terms of the i! sequence multiplied by the appropriate value of i. Because k is the sole index variable in the second term, the total is composed of the first k terms of the k! sequence multiplied by each matching value of k.

The following terms have i ranging from k+1 to the summation's ultimate value, and the total is made up of the first i-1 terms of the i! sequence multiplied by each corresponding value of i. The first component, (k+1)!, accounts for the terms not included in the first two terms in the prior summations.

Overall, the summation represents a combination of factorials and their corresponding sum sequences, with the index variables determining the range of terms to include in each sum.

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Answer:

37.68

Step-by-step explanation:

The formula for getting the circumference of a circle is 2πr

So:

2 * 3.14 * 6

= 37.68

Hope this helps :)

Pls brainliest...

5. There is no solution since 5 = 7 is a false statement. Option C

6. There is no solution since 7x = 6x is a false statement. Option C

7. The value of the angle BCY = 55 degrees

8. The value of exterior angle , x is 137 degrees

Note that algebraic expressions are described as expressions composed of variables, terms, constants, factors and constants.

From the information given, we have that;

5. 6x +8 - 3 = 8x + 7 -2x

collect the like terms

6x + 5 = 6x + 7

5 = 7

6. 9x + 11 - 2x = 6x + 11

collect the terms

7x = 6x

We can see that for the value of the first, x is zero and for the second, there is no solution

7. We have from the diagram that;

25x + 11x = 180; because angles on a straight line is equal to 180 degrees

add the like terms

36x = 180

Make 'x' the subject of formula

x = 5

<BCY = 11x = 11(5) = 55 degrees

8. The sum of the angles in a triangle is 180 degrees

Then,

62 + 61 + y = 180

y = 180 - 43

But, x + y = 180

x = 180 - 43 = 137 degrees

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(a) Volume of the solid generated by revolving the region bounded by the graph is 12.422 cubic units.

(b)

(i) The work done in stretching the spring from its natural length to a length of 10 in. is 54 lb.-in.

(ii) The work done in stretching the spring from a length of 7 in. to a length of 9 in. is approximately 13.5 lb.-in.

(a) To find the volume of the solid generated by revolving the region bounded by the graph[tex]x^2=y-2[/tex] and 2y-x-2=0 for 0≤x≤1 about y=3, we can use the method of cylindrical shells:

First, we need to find the limits of integration for the radius of the shells. Since we are revolving around y=3, the distance between y=3 and the curve x^2=y-2 will give us the radius of the shell.

Solving for y in [tex]x^2=y-2[/tex], we get[tex]y=x^2+2.[/tex] Substituting this into 2y-x-2=0, we get [tex]x=2y-2y^2-2.[/tex] So the limits of integration for the radius will be from [tex]3-(x^2+2) to 3-(2y-2y^2-2).[/tex]

Next, we need to find the height of the shells. This is simply the length of the interval of integration for x, which is 0 to 1.

So the volume of the solid is given by the integral:

[tex]V = \int (3-(x^2+2)) - (3-(2y-2y^2-2)) dx[/tex] from x=0 to x=1

Simplifying and evaluating the integral, we get:

V ≈ 12.422 cubic units.

Therefore, the volume of the solid generated by revolving the region bounded by the graph [tex]x^2=y-2[/tex] and [tex]2y-x-2=0[/tex] for 0≤x≤1 about y=3 is approximately 12.422 cubic units.

(b) (i) The work done in stretching the spring from its natural length of 6 in. to a length of 10 in. can be found using the formula:

W =[tex](1/2)k(d2^2 - d1^2)[/tex]

where k is the spring constant, d1 is the initial length, and d2 is the final length.

Given that the force required to stretch the spring from its natural length of 6 in. to a length of 8 in. is 9 lb., we can find the spring constant as follows:

k = F/(d2 - d1) = 9/(8-6) = 4.5 lb/in

So the work done in stretching the spring from its natural length of 6 in. to a length of 10 in. is:

W = [tex](1/2)(4.5)(10^2 - 6^2)[/tex]= 54 lb.-in.

Therefore, the work done in stretching the spring from its natural length to a length of 10 in. is 54 lb.-in.

(ii) To find the work done in stretching the spring from a length of 7 in. to a length of 9 in., we can use the same formula:

W =[tex](1/2)k(d2^2 - d1^2)[/tex]

Using the same spring constant of 4.5 lb/in, the work done is:

W = [tex](1/2)(4.5)(9^2 - 7^2)[/tex]≈ 13.5 lb.-in.

Therefore, the work done in stretching the spring from a length of 7 in. to a length of 9 in. is approximately 13.5 lb.-in.

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The value of angle C in degrees is 20.0°

A triangle is a closed, 2-dimensional shape with 3 sides, 3 angles, and 3 vertices. A triangle is also a polygon. There are different types of triangle, examples are; Scalene triangle, isosceles triangle, equilateral triangle e.t.c

A triangular theorem states that the sum of angle In a triangle is 180°. This means that , if A,B,C are the angle in a triangle, then A+B+C = 180°

This means that ;

40+120+C = 180°

160+C = 180°

collecting like terms

C = 180- 160

C = 20.0°( nearest tenth)

therefore the value of angle C is 20.0°

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The matrix A of the rotation about the y-axis through an angle of π/2 clockwise as viewed from the positive y-axis is [tex]A=\left[\begin{array}{ccc}0 & 0 & -1 \\0 & 1 & 0 \\1 & 0 & 0\end{array}\right][/tex].

In mathematics, a matrix is a rectangular array or table of numbers, symbols, or expressions, arranged in rows and columns, which is used to represent a mathematical object or a property of such an object.

To find the matrix A of the rotation about the y-axis through an angle of π/2 (90 degrees) clockwise as viewed from the positive y-axis, we can use the following rotation matrix:

[tex]A=\left[\begin{array}{ccc}\cos (\theta) & 0 & -\sin (\theta) \\0 & 1 & 0 \\\sin (\theta) & 0 & \cos (\theta)\end{array}\right][/tex]

Substitute θ with π/2, which is the angle of rotation.

[tex]A=\left[\begin{array}{ccc}\cos \left(\frac{\pi}{2}\right) & 0 & -\sin \left(\frac{\pi}{2}\right) \\0 & 1 & 0 \\\sin \left(\frac{\pi}{2}\right) & 0 & \cos \left(\frac{\pi}{2}\right)\end{array}\right][/tex]

Compute the trigonometric values for cos( π/2) and sin( π/2).

cos( π/2) = 0
sin( π/2) = 1

Substitute the computed values back into the matrix.

[tex]A=\left[\begin{array}{ccc}0 & 0 & -1 \\0 & 1 & 0 \\1 & 0 & 0\end{array}\right][/tex]

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a. 15, 16, 17 : The triangle is an acute triangle

b. 20, 18, 7 : The triangle is an obtuse triangle

c. 17, 144, 145 : The triangle is a right triangle

d. 24, 32, 40 : The triangle is a right triangle

From the question, we are to classify the given triangles as obtuse, acute or right triangles

To classify the triangles, we will consider the longest side of the triangles

a.  15, 16, 17

Is 17² = 15² + 16² ?

17² = 289

15² + 16² = 225 + 256 = 481

NO,

17² < 15² + 16²

Thus,

The triangle is an acute triangle

b.  20, 18, 7

Is 20² = 18² + 7² ?

20² = 400

18² + 7² = 324 + 49 = 373

NO,

20² > 18² + 7²

Thus,

The triangle is an obtuse triangle

a.  17, 144, 145

Is 145² = 144² + 17² ?

145² = 21025

144² + 17² = 20736 + 289 = 21025

YES,

Thus,

The triangle is a right triangle

a.  24, 32, 40

Is 40² = 32² + 24² ?

40² = 1600

32² + 24² = 1024 + 576 = 1600

YES

Hence,

The triangle is a right triangle

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Therefore, the complete homogeneous system solution is: x = [-0.1765, 0.6471, -0.0882] + t1[2, -1, 1] + t2[0, -1, 1]

The system, first we need to find the inverse of matrix A, which is:

A = [3 7 6]

[-3 11 2]

[4 0 -6]

det(A) = 3*(-611 - 20) - 7*(-3*-6) + 6*(-3*2) = -204

adj(A) = [72 18 42]

[54 6 33]

[14 28 14]

[tex]A^{(-1) }= adj(A)/det(A):[/tex]

[-0.3529 0.0882 -0.2059]

[-0.2647 -0.0294 -0.1618]

[-0.0686 -0.1373 -0.0686]

Next, we need to solve for Xp using Xp = [tex]A^{(-1)} * b:[/tex]

b = [1 2 2]

Xp = [tex]A^{(-1)} * b:[/tex]= [-0.1765, 0.6471, -0.0882]

To find Xn, we solve the associated homogeneous system Ax = 0:

[3 7 6][x1] [0]

[-3 11 2][x2] = [0]

[4 0 -6][x3] [0]

Writing this system in augmented form, we have:

[3 7 6 | 0]

[-3 11 2 | 0]

[4 0 -6 | 0]

We can use row reduction to solve for the reduced row echelon form:

[1 0 -2 | 0]

[0 1 1 | 0]

[0 0 0 | 0]

The general solution can be written as:

x = t1[2, -1, 1] + t2[0, -1, 1]

Here t1 and t2 are arbitrary constants.

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Correct Question:

Find the complete solution x= Xp + xn of the system Ax = b, A= b where 3 7 6 -3 11 2 4 0 -6 Xp stands for a particular solution and Xn the general solution of the associated homogeneous system. {1 2 3 3 10 2 2 -2 2 2 . }

This is an exercise of the Pythagorean Theorem, which establishes that in every right triangle, the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the other two sides, called legs.

This can be expressed mathematically as:

Where "a" and "b" are the lengths of the legs and "c" is the length of the hypotenuse. This theorem is one of the fundamental bases of geometry and has many applications in physics, engineering, and other areas of science.

The Pythagorean Theorem formula is used to calculate the length of an unknown side of a right triangle, as long as the lengths of the other two sides are known. It can also be used to determine if a triangle is right if the lengths of its sides are known.

To calculate the hypotenuse, we will apply the formula:

c = √(a² + b²)

Knowing that:

a = 8cm

b = 15cm

Now we just substitute the data in the formula, and calculate the hypotenuse, then

The hypotenuse C of the triangle is 17 cm.

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On average, the metro train travels a distance of 90 kilometers in a single trip.

Since the metro train completes 4 round trips of 90 kilometres, the total distance traveled in a day would be 4290 = 720 kilometres (since a round trip is equivalent to two journeys of 90 kilometres).

To find the average distance traveled, we need to divide the total distance by the number of trips made. Since 4 round trips have been made, the number of trips made would be 4*2 = 8 (since each round trip is equivalent to 2 trips).

Therefore, the average distance traveled by the metro in a day would be 720/8 = 90 kilometres.

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The matrix representing L with respect to the ordered bases E is [ 0 5 3l ][ -2 l -3l ]. The matrix representing L with respect to the ordered bases F is [ 1 l -l/2 ] [ -1 1 3/2 ].

To find the matrix representing the linear transformation L with respect to the ordered bases E and F, we need to determine where L sends each vector in the basis E and express the results as linear combinations of the basis vectors in F. We can then arrange the coefficients of these linear combinations in a matrix.

Let's apply this approach to each of the given linear transformations:

L(x, y, z) = (x + y, z)

To find the image of u1 = (1, 0, -1)T under L, we compute L(u1) = (1 + 0, -1) = (1, -1). Similarly, we can compute L(u2) = (3, l) and L(u3) = (-l, 3l). Now we express each of these images as a linear combination of the vectors in F:

L(u1) = 1*b1 + (-1/2)b2

L(u2) = lb1 + (1/2)*b2

L(u3) = (-l/2)*b1 + (3/2)*b2

These coefficients give us the matrix:

[ 1 l -l/2 ]

[ -1 1 3/2 ]

L(x, y, z) = (x + 2y - z, -x - y + 3z)

Using the same process, we find:

L(u1) = (0, -2)

L(u2) = (5, l)

L(u3) = (3l, -3l)

Expressing these images in terms of E gives the matrix:

[ 0 5 3l ]

[ -2 l -3l ]

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As x approaches to  0, x²/8 approaches 0 the limit is 1/2 and the taylor polynomial for cos(x), for x near 0 is  (x²/2 - x⁴/24)/x

To find the Taylor polynomial of degree 4 for cos(x) near x = 0, we use the following formula:

p4(x) = cos(0) - (x²/2!) + (x⁴/4!) = 1 - (x²/2) + (x⁴/24)

To simplify the ratio (1-cos(x))/x, we substitute cos(x) with p4(x):

(1 - (1 - (x²/2) + (x⁴/24)))/x = (x²/2 - x⁴/24)/x

Now, to find the limit as x approaches 0:

lim (x->0) (x²/2 - x⁴/24)/x = lim (x->0) (x/2 - x³/24)

Using L'Hopital's rule, we differentiate the numerator and the denominator with respect to x:

lim (x->0) (1/2 - x²/8)

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Answer:

  51.2 inches

Step-by-step explanation:

You want the length of a mural whose hypotenuse is 96 inches if the scale drawing has a length of 8 inches and a hypotenuse of 15 inches.

The ratios of corresponding lengths will be the same:

  drawing length / drawing hypotenuse = mural length / mural hypotenuse

  8 in / 15 in = mural length / 96 in

Multiplying the equation by 96 in, we have ...

  (96 in)·8/15 = mural length

  51.2 in = mural length

The mural is 51.2 inches long.

The nearest degree, the pendulum swung approximately 29 degrees.

To find the degrees of rotation for the pendulum swing, we'll use the arc length formula and the definition of a radian. The formula is:

Arc length = Radius × Angle (in radians)

We have the arc length (15 cm) and the radius (30 cm). Rearrange the formula to find the angle:

Angle (in radians) = Arc length / Radius

Angle (in radians) = 15 cm / 30 cm = 0.5 radians

Now, convert radians to degrees using the conversion factor (1 radian ≈ 57.3 degrees):

Angle (in degrees) = 0.5 radians × 57.3 ≈ 28.65 degrees

So, to the nearest degree, the pendulum swung approximately 29 degrees.

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The form of the particular solution of the differential equation x" — x' – 2x = e^t cost – t^2 + cos 3t is x_p(t) = Ae^t cos(t) + Be^t sin(t) + Ct^2 + Dt + Ecos(3t) + Fsin(3t) and the particular solution of the y" – y' + 2y = (2x + 1)e^(x/2) cos (√7/2)x + 3(x^3 – x)e^(x/2) sin (√7/2) x is y_p(x) = (Ae^(x/2) cos(√7/2)x + Be^(x/2) sin(√7/2)x) + (C x^3 + Dx^2 + Ex + F)

Explanation: -

Part (a): -To determine the form of a particular solution to x" - x' - 2x = e^t cos(t) - t^2 + cos(3t),

we look at the non-homogeneous terms on the right-hand side. We see that we have a term of the form e^t cos(t), which suggests a particular solution of the form Ae^t cos(t) or Be^t sin(t).

We also have a polynomial term t^2, which suggests a particular solution of the form At^2 + Bt + C. Finally, we have a term of the form cos(3t), which suggests a particular solution of the form D cos(3t) + E sin(3t).

Thus,

x_p(t) = A e^t cos(t) + B e^t sin(t) + Ct^2 + Dt + E cos(3t) + F sin(3t) is particular solution of the above differential equation.

Part (b): -To determine the form of a particular solution to y" - y' + 2y = (2x + 1)e^(x/2) cos(√7/2)x + 3(x^3 - x)e^(x/2) sin(√7/2)x, we first observe that the right-hand side includes a product of exponential and trigonometric functions. Therefore, a particular solution may take the form of a linear combination of functions of the form e^(ax) cos(bx) and e^(ax) sin(bx).

Additionally, the right-hand side includes a polynomial of degree 3, so we may include terms of the form ax^3 + bx^2 + cx + d in our particular solution.

Overall, a possible form for a particular solution to this differential equation is:

y_p(x) = (Ae^(x/2) cos(√7/2)x + Be^(x/2) sin(√7/2)x) + (C x^3 + Dx^2 + Ex + F)

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We can say with 95% confidence that the population variance σ2 lies within the interval [155.25, 570.06].

To construct a 95% confidence interval for the population variance σ2, we can use the chi-square distribution.

First, we need to calculate the chi-square values for the upper and lower limits of the confidence interval. We use the formula:

chi-square upper = (n-1)*s^2 / χ^2(α/2, n-1)

chi-square lower = (n-1)*s^2 / χ^2(1-α/2, n-1)

where n is the sample size, s is the sample standard deviation, α is the level of significance (0.05 for 95% confidence interval), and χ^2 is the chi-square distribution function.

Plugging in the values, we get:

chi-square upper = (25-1)*14^2 / χ^2(0.025, 24) = 43.98

chi-square lower = (25-1)*14^2 / χ^2(0.975, 24) = 15.14

Next, we can use these chi-square values to calculate the confidence interval for σ2:

confidence interval = [(n-1)*s^2 / chi-square upper, (n-1)*s^2 / chi-square lower]

Plugging in the values, we get:

confidence interval = [(25-1)*14^2 / 43.98, (25-1)*14^2 / 15.14]

confidence interval = [155.25, 570.06]

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The probability of event B is 11/72

Probability is a measure of the likelihood of an event occurring. It is expressed as a number between 0 and 1, with 0 indicating impossibility and 1 indicating certainty, and is based on the ratio of favorable outcomes to total possible outcomes.

According to the given information:

We can use the formula for the probability of the union of two events:

p(A or B) = p(A) + p(B) - p(A and B)

Substituting the given values, we have:

1/6 = 1/8 + p(B) - 1/9

Simplifying this equation, we get:

1/6 = (9 + 72p(B) - 8)/72

Multiplying both sides by 72, we get:

12 = 9 + 72p(B) - 8

Solving for p(B), we get:

p(B) = (12 - 1)/72 = 11/72

Therefore, the probability of event B is 11/72

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The probability of event B as a simplified fraction  is 11/72

What is Probability?

Probability is a measure of the likelihood of an event occurring. It is expressed as a number between 0 and 1, with 0 indicating impossibility and 1 indicating certainty, and is based on the ratio of favorable outcomes to total possible outcomes.

According to the given information:

We can use the formula for the probability of the union of two events:

=>p(A or B) = p(A) + p(B) - p(A and B)

Substituting the given values, we have:

=> 1/6 = 1/8 + p(B) - 1/9

Simplifying this equation, we get:

=>1/6 = (9 + 72p(B) - 8)/72

Multiplying both sides by 72, we get:

=> 12 = 9 + 72p(B) - 8

Solving for p(B), we get:

=> p(B) = (12 - 1)/72 = 11/72

Therefore, the probability of event B as simplified fraction  is 11/72.

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