Find 9(cos 20°+i sin 20°)/5(cos 75 i sin 75°) and write the result in trigonometric form.
1. 5/9 (cos 95° + i sin 95°)

2. 9/5 (cos 305° + I sin 305°)

3. 5/9 (Cos 55° + i sin 55°)

4. 9/5 (cos 95° + I sin 95°)

A2 is the matrix -4 3 -1 -1, a2 is -4. A3 is the matrix 7 -4 -1 -5, a3 is -1. Therefore, the answer is: a1 = 2, a2 = -4, a3 = -1, A1 = 7 3 -5 -1.

Given that A is the matrix:

| 2  4 -7 |
| -4  7  3 |
| -1 -5 -1 |

The cofactor expansion of the determinant of A along column 1 is: det(A) = a1 · |A1| + a2 · |A2|+ a3 · |A3|

Here, a1, a2, and a3 are the elements of the first column of the matrix A:
a1 = 2
a2 = -4
a3 = -1

To find the matrices A1, A2, and A3, we need to remove the corresponding row and column of each element:

A1 is obtained by removing the first row and first column:
| 7  3 |
|-5 -1 |

A2 is obtained by removing the second row and first column:
| 4 -7 |
|-5 -1 |

A3 is obtained by removing the third row and first column:
| 4 -7 |
| 7  3 |

So, the cofactor expansion of the determinant of A along column 1 is:

det(A) = 2 · |A1| - 4 · |A2| - 1 · |A3|

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The team pays d - 3 dollars for each hat after the discount.

Cost is the amount of money required to purchase or produce a particular item or service. It is often represented by the symbol "C" in mathematical equations.

According to the given information:

Let's start by breaking down the given information:

The team buys 14 hats in total.

The total cost for the 14 hats is 14(d-3) dollars.

The team received a discount on each hat purchase.

To find the cost of each hat, we need to divide the total cost by the number of hats:

cost per hat = total cost / number of hats

Plugging in the given values, we get:

cost per hat = 14(d-3) / 14

Simplifying the expression by canceling out the common factor of 14, we get:

cost per hat = d - 3

Therefore, the team pays d - 3 dollars for each hat after the discount.

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The corresponding homogeneous differential equation with constant coefficients is y''' - (4i + 5)y'' + 20iy' - 20y = 0, where y is the dependent variable and i is the imaginary unit.

Given that the roots of the cubic auxiliary equation are r₁ = 2i and r₂ = 5, we can write the equation as

(x - 2i)(x - 2i)(x - 5) = 0

Expanding this equation, we get

(x² - 4ix + 4)(x - 5) = 0

Simplifying further, we get

x³ - (4i + 5)x² + 20ix - 20 = 0

Therefore, the corresponding homogeneous differential equation with constant coefficients is

y''' - (4i + 5)y'' + 20iy' - 20y = 0

where y is the dependent variable and i is the imaginary unit.

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The energy of an electron in a one-dimensional box can be calculated using the formula: E = (n^2 * h^2) / (8 * m * L^2)

where n is the principal quantum number, h is Planck's constant, m is the electron's mass, and L is the length of the box.

The energy of a photon can be calculated using the formula:

E = (h * c) / λ

where c is the speed of light, and λ is the wavelength of the photon.

Given that the energy of the electron and the photon are equal, we can equate the two formulas:

(n^2 * h^2) / (8 * m * L^2) = (h * c) / λ

For n = 1 and λ = 400 nm:

(1^2 * h^2) / (8 * m * L^2) = (h * c) / (400 * 10^-9 m)

Solving for L, we get:

L^2 = (h^2) / (8 * m * (h * c) / (400 * 10^-9 m))

L^2 = (h * 400 * 10^-9 m) / (8 * m * c)

L = √((h * 400 * 10^-9 m) / (8 * m * c))

Plug in the values for h (6.626 * 10^-34 Js), m (9.109 * 10^-31 kg), and c (2.998 * 10^8 m/s):

L ≈ 2.09 * 10^-10 m

Therefore, the length of the one-dimensional box is approximately 2.09 * 10^-10 meters.

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The z value that leaves area 0.1056 in the right tail is approximately 1.26.

The z value that leaves an area of 0.1056 in the right tail is found by using the standard normal distribution table or a z-score calculator.

Here's how to find it:

1. Since the area to the right of the z value is 0.1056, the area to the left will be 1 - 0.1056 = 0.8944.

2. Look up the corresponding z value for the area 0.8944 in a standard normal distribution table or use a z-score calculator.

3. Find the z value associated with this area.

After performing these steps, you will find that the z value that leaves an area of 0.1056 in the right tail is approximately 1.26.

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Answer:

Step-by-step explanation:

f(-1) = 14

There are 11 ways to choose 10 coins from a piggy bank containing 100 identical pennies and 80 identical nickels.

To determine how many ways there are to choose 10 coins from a piggy bank containing 100 identical pennies and 80 identical nickels, you need to use combinations with repetition.

Since there are two types of coins (pennies and nickels), we can use the formula:

C(n + r - 1, r)

where n represents the number of types of coins (2 in this case), and r represents the number of coins we want to choose (10 in this case).

So, the formula becomes:

C(2 + 10 - 1, 10) = C(11, 10)

Calculating the combination, we get:

C(11, 10) = 11! / (10! * (11 - 10)!) = 11

Therefore, there are 11 ways to choose 10 coins from a piggy bank containing 100 identical pennies and 80 identical nickels.

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Answer:

13 (x= -2, y= 1)

14 (x=3, y= -4)

Step-by-step explanation:

1 x+5y=3

3x-2y=-8

u gonna add 3 into x and make it negative

2 -3x-15y=-9

3x-2y=-8

x will be gone since 3x-3x

3 -17y=-17

y= 1

going to add y into x+5y=3

x+5=3

x=-2

question 14

y=2x-10

y=-4x+8

add - to everything in the bottom

y=2x-10

-y=4x-8

0=6x-18

18=6x

3=x

add 3 into x in y=2x-10

y=6-10

y=-4

The Taylor polynomials P1, P2, P3, and P4 for f(x) = cos(-5x) centered at a = 0 are given by:

P1(x) = 1
P2(x) = 1 + (-5x)²/2!
P3(x) = 1 - 25x²/2! + (-5x)⁴/4!
P4(x) = 1 - 25x²/2! + 625x⁴/4! - (-5x)⁶/6!

To find the Taylor polynomials centered at a = 0 for f(x) = cos(-5x), follow these steps:

1. Calculate the derivatives of f(x) up to the fourth derivative.
2. Evaluate each derivative at a = 0.
3. Use the Taylor polynomial formula to calculate P1, P2, P3, and P4.
4. Simplify the expressions for each polynomial.

Remember that the Taylor polynomial formula is given by:

Pn(x) = f(a) + f'(a)(x-a) + f''(a)(x-a)²/2! + ... + fⁿ(a)(x-a)ⁿ/n!

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The solution for the given system of linear equations is a ≈ -1.13, b ≈ -4.01, c ≈ 2.75, d ≈ 9.22, and e ≈ -6.09.


1. Write the given equations in matrix form (A * X = B), where A is the matrix of coefficients, X is the matrix of variables (a, b, c, d, e), and B is the matrix of constants (57.1, 27.6, -81.2, -22.2, -12.2).

2. To solve using inverse method, first, find the inverse of matrix A (A_inv). Use any tool or method for matrix inversion, such as Gaussian elimination or Cramer's rule.

3. Multiply A_inv with matrix B (A_inv * B) to obtain the matrix X, which contains the solutions for a, b, c, d, and e.

4. For the left division method, you can use MATLAB or Octave software. Use the command "X = A \ B" to obtain the matrix X, which contains the solutions for a, b, c, d, and e.

After performing the calculations, the approximate solutions are a ≈ -1.13, b ≈ -4.01, c ≈ 2.75, d ≈ 9.22, and e ≈ -6.09.

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To find where the tangent line is horizontal, we set [tex]\frac{Dx}{Dy}[/tex] = 0 and solve for x and y. To find where the tangent line is vertical. The correct answer is These are the points where the tangent line is vertical.

We set the derivative undefined, and solve for x and y.

a) To find [tex]\frac{Dx}{Dy}[/tex], we first differentiate the equation with respect to x:

[tex]3x^2 + 3y^2(dy/dx) - y^2 - 2xy(dy/dx)[/tex][tex]= 0[/tex]

Simplifying and solving for [tex]\frac{Dx}{Dy}[/tex], we get:

[tex]\frac{Dx}{Dy}[/tex] =[tex](y^2 - 3x^2) / (3y^2 - x^2)[/tex]

b) To find where the tangent line is horizontal, we need to find where [tex]\frac{Dx}{Dy}[/tex]=[tex]0[/tex]. Using the equation we found in part a:

[tex](y^2 - 3x^2) / (3y^2 - x^2)[/tex][tex]= 0[/tex]

This occurs when [tex]y^2 = 3x^2.[/tex] Substituting this into the original equation, we get:[tex]x^3 + 3x^2y - xy^2 = 5[/tex]

Solving for y, we get two solutions: [tex]y = x*\sqrt{3}[/tex]

These are the points where the tangent line is horizontal. To find where the tangent line is vertical, we need to find where the derivative is undefined. Using the equation we found in part a:[tex]3y^2 - x^2 = 0[/tex]

This occurs when [tex]y = +/- x*sqrt(3)/3.[/tex] Substituting this into the original equation, we get: [tex]x^3 + 2x^5/27 = 5[/tex]

Solving for x, we get two solutions: [tex]x = -1.554, 1.224[/tex]

Substituting these values back into the equation for y, we get the corresponding y values:[tex]y = -1.345, 1.062[/tex]

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The hottest temperature on the edge of the elliptical plate is 32 and the coldest temperature is 8.

The edge of the elliptical plate is given by the equation [tex]x^2 + xy + y^2 = 4.[/tex]

To find the hottest and coldest temperatures on this edge, we need to find the maximum and minimum values of the function t(x,y) subject to this constraint.

One way to solve this problem is to use Lagrange multipliers. Let's define a new function F(x,y,λ) as follows:

[tex]F(x,y,\lambda) = 16x^2 + y^2 + \lambda(x^2 + xy + y^2 - 4)[/tex]

The critical points of F(x,y,λ) occur when the partial derivatives with respect to x, y, and λ are all equal to zero:

∂F/∂x = 32x + 2λx + λy = 0

∂F/∂y = 2y + 2λy + λx = 0

∂F/∂λ =[tex]x^2 + xy + y^2 - 4[/tex]= 0

Solving these equations simultaneously, we get:

[tex]x = \pm \sqrt(2), y = \pm \sqrt(2)[/tex], λ = 8/3

The function t(x,y) takes on its maximum value of 32 at the points [tex](\sqrt(2), \sqrt(2))[/tex] and [tex](-\sqrt(2), -\sqrt(2))[/tex] and its minimum value of 8 at the points [tex](\sqrt(2), -\sqrt(2))[/tex] and [tex](-\sqrt(2), \sqrt(2)).[/tex]

Therefore, the hottest temperature on the edge of the elliptical plate is 32 and the coldest temperature is 8.

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The expected change in temperature in degree Fahrenheit for each additional cricket chirp in one minute.

Given the relationship between the number of times a certain species of cricket will chirp in one minute and the temperature outside.

Here, we see that the best fit is a linear regression.

On the y- axis temperature in degree Fahrenheit is labeled and on the x axis chirps per minute is labelled.

Since, the slope = Rate of change of y/ Rate of change of x

So, the slope of line represents the expected change in temperature in degree Fahrenheit for each additional cricket chirp in one minute.

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g(x) and d(x) are associates in F[x], which means there exists a nonzero c ∈ F such that g(x) = c · d(x). Thus, every gcd of a(x) and b(x) has the form c · d(x) for some nonzero c ∈ F.

First, let's prove that if d(x) is a gcd of a(x) and b(x), then c · d(x) is also a gcd of a(x) and b(x) for every nonzero c ∈ F.

Let e(x) be a common divisor of a(x) and b(x) in F[x]. Then we have:

a(x) = e(x) q(x)

b(x) = e(x) r(x)

for some q(x), r(x) ∈ F[x]. Since d(x) is a gcd of a(x) and b(x), we have d(x) | e(x), which means there exists a polynomial s(x) ∈ F[x] such that e(x) = d(x) s(x). Therefore,

a(x) = d(x) s(x) q(x) = c · d(x) (s(x) q(x))

b(x) = d(x) s(x) r(x) = c · d(x) (s(x) r(x))

which shows that c · d(x) is also a common divisor of a(x) and b(x). Since this holds for every nonzero c ∈ F, we can conclude that c · d(x) is a gcd of a(x) and b(x).

Next, we need to show that every gcd of a(x) and b(x) has the form c · d(x) for some nonzero c ∈ F. Let g(x) be a gcd of a(x) and b(x), and let d(x) be another gcd of a(x) and b(x). Then we have:

g(x) | d(x) (since d(x) is also a gcd of a(x) and b(x))

d(x) | g(x) (since g(x) is a gcd of a(x) and b(x))

Therefore, g(x) and d(x) are associates in F[x], which means there exists a nonzero c ∈ F such that g(x) = c · d(x). Thus, every gcd of a(x) and b(x) has the form c · d(x) for some nonzero c ∈ F.

Combining these two results, we can conclude that if d(x) is a gcd of a(x) and b(x), then so is c · d(x) for every nonzero c ∈ F, and conversely, every gcd of a(x) and b(x) has the form c · d(x) for some nonzero c ∈ F.

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To determine the number of green chairs and red chairs in each row, divide 54 and 36 by 9.

The total number of chairs can be expressed as the product of

9 and the 6 of the green chairs and 4 red chairs in each row.

This is represented by the expression 9(6 + 4)

Number of green chairs = 54

Number of red chairs = 36

Number of rows of chairs = 9

Number of green chairs in each row = 54/9

= 6

Number of red chairs in each row = 36/9

= 4

Ultimately, the expression can be written as 9(6 + 4)

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a) The angle's measure in radians is 0.397 radians.

b)Dustin skis 7.26 km if the angle measures 3 radians.

a. To find the angle's measure in radians:

We need to use the formula:

θ = s/r

where θ is the angle in radians, s is the length of the arc, and r is the radius of the circle.

In this case, Dustin travels 0.96 km along the ski trail, which is the length of the arc. The radius of the circle is 2.42 km. So we have:

θ = 0.96/2.42 = 0.397 radians (rounded to three decimal places)

Therefore, the angle's measure in radians is 0.397 radians.

b. To find how far Dustin skis if the angle measures 3 radians:

We can use the same formula and rearrange it to solve for s:

s = θr

In this case, θ is 3 radians and r is still 2.42 km. So we have:

s = 3 x 2.42 = 7.26 km

Therefore, Dustin skis 7.26 km if the angle measures 3 radians.

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(rho, θ, ϕ) = (sqrt(6), 3π/4 or 7π/4, arccos(-sqrt(2/3)) or 2π - arccos(-sqrt(2/3)) or π - arccos(-sqrt(2/3)) or π + arccos(-sqrt(2/3))).

(a) Rectangular coordinates are (0, -6, 0). From the distance formula, we have rho = sqrt(x^2 + y^2 + z^2) = sqrt(0^2 + (-6)^2 + 0^2) = 6.

Since x = rhosin(ϕ)cos(θ) and z = rhocos(ϕ), we have 0 = rhocos(ϕ) which implies ϕ = π/2. Also, -6 = rho*sin(ϕ)sin(θ), but sin(ϕ) = 1, so we have -6 = rhosin(θ) or sin(θ) = -6/6 = -1. Therefore, we have (rho, θ, ϕ) = (6, π, π/2).

(b) Rectangular coordinates are (-1, 1, -2). From the distance formula, we have rho = sqrt(x^2 + y^2 + z^2) = sqrt(1^2 + 1^2 + (-2)^2) = sqrt(6).

Since x = rho*sin(ϕ)cos(θ), y = rhosin(ϕ)sin(θ), and z = rhocos(ϕ), we have:

-1 = sqrt(6)*sin(ϕ)*cos(θ)

1 = sqrt(6)*sin(ϕ)*sin(θ)

-2 = sqrt(6)*cos(ϕ)

From the first two equations, we have:

tan(θ) = 1/-1 = -1

Therefore, θ = 3π/4 or 7π/4.

From the third equation, we have:

cos(ϕ) = -2/sqrt(6) = -sqrt(2/3)

Therefore, ϕ = arccos(-sqrt(2/3)).

Finally, from the first equation, we have:

sin(ϕ)*cos(θ) = -1/sqrt(6)

Therefore, sin(ϕ) = -1/(sqrt(6)*cos(θ)) and we can compute ϕ using arccos(-sqrt(2/3)) and arccos(cos(θ)):

If θ = 3π/4, then cos(θ) = -1/sqrt(2), and sin(ϕ) = -sqrt(3/2). Thus, ϕ = arccos(-sqrt(2/3)) or ϕ = 2π - arccos(-sqrt(2/3)).

If θ = 7π/4, then cos(θ) = -1/sqrt(2), and sin(ϕ) = sqrt(3/2). Thus, ϕ = π - arccos(-sqrt(2/3)) or ϕ = π + arccos(-sqrt(2/3)).

Therefore, the spherical coordinates of the point (-1, 1, -2) are:

(rho, θ, ϕ) = (sqrt(6), 3π/4 or 7π/4, arccos(-sqrt(2/3)) or 2π - arccos(-sqrt(2/3)) or π - arccos(-sqrt(2/3)) or π + arccos(-sqrt(2/3))).

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The probability that a 25-year-old person from this group prefers biking is: 68/229.

The total number of people in the survey between the ages of 23 and 27 is 229. The number of people who prefer biking in this group is 68.

Therefore, the probability that a 25-year-old person from this group prefers biking is: 68/229

To simplify the fraction, we can divide both the numerator and denominator by their greatest common factor (GCF), which is 1:

68/229 = 68/229

So the probability that a 25-year-old person from this group prefers biking is 68/229.

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Step-by-step explanation:

line MO,line NO, line

MN

Answer:

0.064 mi³

Step-by-step explanation:

Volume of cube = s³

S = 2/5 mi

Let's solve

(2/5)³ = 0.064 mi³

So, the volume of the cube is 0.064 mi³

A. the 95% confidence interval for the average value of y when x = 2 is (4.9241, 5.4283).
B. The 95% prediction interval for some value of y to be observed in the future when x = 2 is (4.6619, 5.4576).

(a) To find a 95% confidence interval for the average value of y when x = 2, use the provided information:

Predicted Value for New Obs 1 (x = 2): 5.1762
SE Fit: 0.0926

Now, apply the formula for confidence intervals:

CI = Predicted Value ± (t-value * SE Fit)

For a 95% confidence interval and degrees of freedom = 4 (6 points - 2 parameters), the t-value is approximately 2.776 (using a t-table).

CI = 5.1762 ± (2.776 * 0.0926)

CI = (5.1762 - (2.776 * 0.0926), 5.1762 + (2.776 * 0.0926))
CI = (4.9241, 5.4283)

So, the 95% confidence interval for the average value of y when x = 2 is (4.9241, 5.4283).

(b) To find a 95% prediction interval for some value of y to be observed in the future when x = 2, use the information provided:

95.0% PI: (4.6619, 5.4576)

The 95% prediction interval for some value of y to be observed in the future when x = 2 is (4.6619, 5.4576).

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The unknown number is -50.

Let's start by translating the given statement into an equation.

"The quotient of a number and negative five" can be written as x/(-5), where x is the unknown number. "Increased by negative seven" means we add -7 to this expression. Finally, we are told that this expression is equal to three. Putting it all together, we get:

x/(-5) - 7 = 3

We can simplify this equation by adding 7 to both sides:

x/(-5) = 10

Multiplying both sides by -5, we get:

x = -50

So the unknown number is -50.

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Answer:

Step-by-step explanation:

a) The discount is 20% of the regular price, which is:

Discount = 20% x $1598 = $319.60

b) The sale price before taxes can be calculated by subtracting the discount from the regular price:

Sale price before taxes = Regular price - Discount

Sale price before taxes = $1598 - $319.60

Sale price before taxes = $1278.40

c) To calculate the sale price including taxes, we need to add the GST of 5% to the sale price before taxes:

Sale price including taxes = Sale price before taxes + (GST x Sale price before taxes)

Sale price including taxes = $1278.40 + (0.05 x $1278.40)

Sale price including taxes = $1278.40 + $63.92

Sale price including taxes = $1342.32

Therefore, the sale price including taxes is $1342.32.

a. To find the median exam score, we need to arrange the scores in order from least to greatest. Then we find the middle score. In this case, the dotplot is not available, so I cannot provide the exact median score. However, once the scores are arranged in order, we can identify the middle score as the median.

b. Without doing any calculations, it is difficult to estimate whether the mean is about the same as the median, higher than the median, or lower than the median. However, if the distribution is roughly symmetric, we can expect the mean to be about the same as the median. If the distribution is skewed, then the mean will be pulled towards the tail of the distribution, and may be higher or lower than the median depending on the direction of the skew. Without additional information about the shape of the distribution, it is difficult to make an accurate estimate.

a. To find the median exam score, follow these steps:

1. Arrange the final exam scores from the dot plot in ascending order.
2. Since there are 25 students (an odd number), the median is the middle value. It is the 13th value in the ordered list.

b. Without doing any calculations, we can estimate if the mean is about the same as the median, higher, or lower based on the distribution of the scores. If the dot plot shows a symmetric distribution, the mean and median would be approximately equal. If the distribution is skewed to the right (with a few high scores pulling the average up), the mean would be higher than the median. If the distribution is skewed to the left (with a few low scores pulling the average down), the mean would be lower than the median. if the distribution is roughly symmetric, we can expect the mean to be about the same as the median.

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The equation of the tangent line to f-1(x) at the point (3, -1) is y = 1/(-2) x - 1/2.

This is because the slope of the tangent line to f(x) at (-1,3) is -2, and since f(x) and f-1(x) are inverse functions, the slopes of their tangent lines are reciprocals.

Therefore, the slope of the tangent line to f-1(x) at (3,-1) is -1/2. To find the y-intercept, we can use the fact that the point (3,-1) is on the tangent line. Plugging in x=3 and y=-1 into the equation y = -1/2 x + b, we get b = 1/2. Therefore, the equation of the tangent line to f-1(x) at (3,-1) is y = 1/(-2) x - 1/2.

In summary, to find the equation of the tangent line to f-1(x) at a point (a,b), we first find the point (c,d) on the graph of f(x) that corresponds to (a,b) under the inverse function.

Then, we find the slope of the tangent line to f(x) at (c,d), take the reciprocal, and plug it into the point-slope formula to find the equation of the tangent line to f-1(x) at (a,b).

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hope that helps. went ahead and did the solution so you could see the steps

Therefore, the global minimum of f(x) on S is at [tex]x = 1/\sqrt{5[/tex]and the global maximum does not exist. And the global minimum of f(x) on S is at x = 2 and the global maximum is at x = 1.

A function is a relationship between a set of inputs (called the domain) and a set of outputs (called the range) with the property that each input is associated with exactly one output. In other words, a function maps each element in the domain to a unique element in the range.

Functions are commonly denoted by a symbol such as f(x), where x is an element of the domain and f(x) is the corresponding output value. The domain and range of a function can be specified explicitly or can be determined by the context in which the function is used.

(i) To find the global maximizers and minimizers of the function f(x) = 4x²+1/4x on the interval S=[1/√5,[infinity]], we first need to find the critical points of f(x) within S.

Taking the derivative of f(x) with respect to x, we get:

f'(x) = 8x - 1/4x²

Setting f'(x) = 0 to find critical points, we get:

8x - 1/4x² = 0

Multiplying both sides by 4x², we get:

32x³ - 1 = 0

Solving for x, we get:

x = 1/∛32 = 1/2∛2

Note that this critical point is not in the interval S, so we need to check the endpoints of S as well as any vertical asymptotes of f(x).

At x = 1/√5, we have:

f(1/√5) = 4(1/5) + 1/(4(1/√5)) = 4/5 + √5/4

At x → ∞, we have:

Lim x→∞ f(x) = ∞

Therefore, the global minimum of f(x) on S is at [tex]x = 1/\sqrt5[/tex] and the global maximum does not exist.

(ii) To find the global maximizers and minimizers of the function[tex]f(x) = x^5 - 8x^3[/tex] on the interval S=[1,2], we first need to find the critical points of f(x) within S.

Taking the derivative of f(x) with respect to x, we get:

[tex]f'(x) = 5x^4 - 24x^2[/tex]

Setting f'(x) = 0 to find critical points, we get:

[tex]5x^4 - 24x^2 = 0[/tex]

Factoring out [tex]x^2[/tex], we get:

[tex]x^2(5x^2 - 24) = 0[/tex]

Solving for x, we get:

[tex]x = 0 or x =±\sqrt(24/5)[/tex]

Note that none of these critical points are in the interval S, so we need to check the endpoints of S.

At x = 1, we have:

[tex]f(1) = 1 - 8 = -7[/tex]

At x = 2, we have:

[tex]f(2) = 32 - 64 = -32[/tex]

Therefore, the global minimum of f(x) on S is at x = 2 and the global maximum is at x = 1.

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The steps to use to solve the problem are:

Lizzie had practiced 15 fewer minutes on Tuesday than on Monday.

Note that from the question:

T = Tuesday

M = Monday

So T = M - 15,  

70  = M - 15

Hence  M = 85 minutes.

B. If Lizzie were to worked out for 85 minutes on Monday as well as 70 minutes on Tuesday, so she practiced:

85 - 70

= 15

So  Lizzie had practiced 15 fewer minutes on Tuesday than that of Monday.

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See full question below

Assessment items Lizzie works out 15 fewer minutes on Tuesday than on Monday. She worked out 70 minutes on Tuesday. Use the five-step problem-solving plan. How many minutes did she work out on Monday?How many fewer minutes did Lizzie practice on Tuesday than on Monday?