Given that:
f(x)=x^(12)h(x)
h(−1)=4
h(−1)=7
find f(−1)

The solution to this problem is given by: u(r) = u_ohi + (u_1 - u_ohi) * [(ln(r) - ln(a))/(ln(b) - ln(a))]. The temperature value at any point within the region between the two spheres, allowing you to understand the distribution of heat in this system.

The boundary value problem gives models the temperature distribution between two concentric spheres.

The solution of this problem can provide valuable information about the temperature at different points between the spheres.

The equation takes into account the distribution of temperature in the radial direction and the rate of change of temperature.

The values of u_ohi and u_1, which represent the temperature at the inner and outer sphere respectively, are important parameters in this problem.

The solution of this boundary value problem can be used to determine the temperature distribution in different spheres and to study heat transfer in various systems.

The boundary value problem you've provided, r d^2u/dr^2 + 2 du/dr = 0 with conditions u(a) = u_ohi and u(b) = u_1, models the temperature distribution between two concentric spheres of radii a and b, where a < b.

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The sampling distribution of the natural log of the odds ratio (lnOR) will be used for further statistical analyses to determine the relationship between smoking and breast cancer therefore lnOR  =0.86.

Based on the data provided from the case-control study of breast cancer and smoking, we can calculate the odds ratio (OR) to understand the association between smoking and breast cancer. Here's the data:

- Smoker: 25 cases, 15 controls
- Non-smoker: 75 cases, 85 controls

The odds ratio is calculated as (odds of exposure among cases) / (odds of exposure among controls), which is:

OR = (25/75) / (15/85) = 2.36

However, statistical inferences for odds ratios are based on the natural log of the odds ratio (lnOR) because the distribution for an odds ratio does not follow a normal distribution. To get the lnOR, we take the natural logarithm of the OR:

lnOR = ln(2.36) ≈ 0.86

The sampling distribution of the natural log of the odds ratio (lnOR) will be used for further statistical analyses to determine the relationship between smoking and breast cancer.

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The point that maximizes the objective function is (9, 1) which gives the highest value of z = 53.

The answer is d. (9, 1).

To find the point that maximizes the objective function z = 6x - y, we need to evaluate the function at each given point and see which one gives the highest result.

a. z = 6(1) - 2 = 4
b. z = 6(1) - 5 = 1
c. z = 6(6) - 8 = 28
d. z = 6(9) - 1 = 53

To determine which point maximizes the objective function z = 6x - y, we will evaluate the function at each given point:

a. (1, 2): z = 6(1) - 2 = 4
b. (1, 5): z = 6(1) - 5 = 1
c. (6, 8): z = 6(6) - 8 = 28
d. (9, 1): z = 6(9) - 1 = 53

The point that maximizes the objective function is point d. (9, 1), with a value of z = 53.

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A two-tailed test is used in sample of 10 observations with an alpha level of 0.10. The critical value for this test is ± 1.697. These critical values are used to determine the rejection region of your hypothesis test.

In a two-tailed test with a sample of 10 observations and alpha equal to 0.10, the critical value would be ±1.697. This means that if the test statistic falls outside of this range, it would be considered statistically significant and we would reject the null hypothesis. The use of a two-tailed test means that we are interested in testing for the possibility of a difference in either direction, as opposed to a one-tailed test where we would only be interested in a difference in one specific direction.

Among the significance tests, single-ended and two-tailed tests are other ways of calculating the significance of the measurements determined from the data set under the test. A two-tailed test is appropriate if the predicted value is greater or less than the value on a test, i.e. whether the test taker will score some points higher or lower. This method is used to test the null hypothesis, if the predicted value is in the critical region, it accepts the alternative hypothesis instead of the null hypothesis. A one-tailed test is appropriate if the estimated value differs from the reference value in one direction (left or right) but not in two directions.

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What is Vector field?

A vector field is a function that associates a vector to every point in a given space, commonly used in calculus and physics to model physical phenomena.

According toh the given information:

To sketch the vector field F(x, y) = ([tex]Y_{i} +X_{j}[/tex])/ sqrt(x² + y²), we can first analyze the behavior of the vector field at various points in the xy-plane.

Let's consider a few points:

1) At the origin (0,0), the denominator of the expression for F is undefined, so the vector field is not defined at this point.

2) Along the x-axis (y = 0), F(x,0) = xj / |x|, which means that the vectors point horizontally to the left for negative values of x and horizontally to the right for positive values of x.

3) Along the y-axis (x = 0), F(0,y) = yi / |y|, which means that the vectors point vertically upwards for positive values of y and vertically downwards for negative values of y.

4) At points away from the origin, we can analyze the direction of the vectors by considering the value of the expression [tex]Y_{i} +X_{j}[/tex] . If y is positive, then the vector will point upwards (in the positive y direction) and if y is negative, the vector will point downwards (in the negative y direction). Similarly, if x is positive, the vector will point towards the right (in the positive x direction) and if x is negative, the vector will point towards the left (in the negative x direction). The magnitude of the vectors decreases as we move away from the origin, because the denominator of the expression for F increases.

Based on this analysis, we can sketch the vector field.

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Using the vector end points the slope of the vector field is plotted.

The steps below are used to create a vector field:

a) Convert the supplied function to vector notation (also known as vector components form).

b) Define some arbitrary vector space points.

c) Apply the provided function to each of these points to determine the vector values.

d) Assess the arbitrary points as the absolute starting position and the arbitrary points plus vector values as the absolute finishing point.

Draw each of the aforementioned vectors such that it begins at the aforementioned starting point and finishes at the aforementioned computed finishing point.

For the given vector field we evaluate the function at different coordinates such as (0, 1), (0, -1), (1, 0), (-1, 0).

For f(0, 1) we have <1, 1>

For (1, 0) = <1, 1>

For (-1, 0) = <-1, -1>

Using the vector end points the slope of the vector field is plotted.

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Answer:

y = (-3/2)x + 4.

Step-by-step explanation:

y - 4 = (2/3)(x - 9)

y = (2/3)x - (2/3)(9) + 4

y = (2/3)x - 2

The slope of this line is 2/3.

A line that is perpendicular to this line will have a slope that is the negative reciprocal of 2/3. To find the negative reciprocal, we flip the fraction and change the sign:

slope of perpendicular line = -3/2

Now we can use the point-slope form of the equation of a line, which is:

y - y1 = m(x - x1)

where m is the slope of the line, and (x1, y1) is a point on the line.

Substituting the given point (6,-5) and the slope -3/2, we get:

y - (-5) = (-3/2)(x - 6)

y + 5 = (-3/2)x + 9

y = (-3/2)x + 4

Therefore, the equation of the line that is perpendicular to y - 4 = (2/3)(x - 9) and passes through the point (6,-5) is y = (-3/2)x + 4.

Answer:

2

Step-by-step explanation:

The region bounded above by the surface z=4 cos xsin y and below by the rectangle R:

We can use a double integral to find the volume of the region:

V = ∫∫R 4cos(x)sin(y) dA

where R is the rectangle defined by:

0 ≤ x ≤ π/2

0 ≤ y ≤ π/2

Then we can evaluate the integral as follows:

V = ∫∫R 4cos(x)sin(y) dA

= ∫0^(π/2) ∫0^(π/2) 4cos(x)sin(y) dxdy

= ∫0^(π/2) [4sin(x)](0 to π/2) dy

= ∫0^(π/2) 4sin(π/2) dy

= 4(sin(π/2))(π/2 - 0)

= 4(1)(π/2)

= 2π

Therefore, the volume of the region bounded above by the surface z=4 cos xsin y and below by the rectangle R is 2π.

The inverses of these transformations and compositions include the following:

a. [tex]T_{(-5,1)}[/tex]

b. [tex]T_{(-2,-3)}R_{0,180^{\circ}}[/tex]

In Mathematics and Geometry, a transformation is the movement of a point from its initial position to a new location. This ultimately implies that, when a geometric figure or object is transformed, all of its points would also be transformed.

By critically observing the transformation rule and compositions, we can reasonably infer and logically deduce the following:

[tex]T_{(5,-1)}[/tex] = translation right 5 units and 1 unit down, so the inverse is left 5 units and 1 unit up i.e [tex]T_{(-5,1)}[/tex]

[tex]R_{0,180^{\circ}}T_{(2,3)}[/tex] = rotation of 180° about the origin and translation right 2 units and 3 unit up, so the inverse is [tex]T_{(-2,-3)}R_{0,180^{\circ}}[/tex]

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The two smallest positive solutions for 4 sin(2x) = 2 are x = π/12 and x = 5π/12.

Starting with 4 sin (2x) = 2, we can simplify it by dividing both sides by 4 to get:

sin (2x) = 1/2

To solve for the two smallest positive solutions a and b, we need to find the values of 2x that satisfy sin (2x) = 1/2.

We know that sin (π/6) = 1/2, so one solution is 2x = π/6, which means x = π/12.

The next solution can be found by adding the period of sin (2x), which is π. Therefore, the next solution is 2x = π - π/6 = 5π/6, which means x = 5π/12.

Thus, the two smallest positive solutions for x are:

a = π/12 ≈ 0.26

b = 5π/12 ≈ 1.31

Therefore, the solution is a = 0.26 and b = 1.31.

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To find the probability p(1.6) for a random variable x with a gamma distribution where α=2 and β=1, you'll need to use the gamma probability density function. The gamma is given by:

f(x) = (β^α * x^(α-1) * e^(-βx)) / Γ(α)

where Γ(α) is the gamma function of α.

Now, plug in the values for α, β, and x:

f(1.6) = (1^2 * 1.6^(2-1) * e^(-1*1.6)) / Γ(2)

To calculate Γ(2), note that Γ(n) = (n-1)! for positive integers. In this case, Γ(2) = (2-1)! = 1! = 1.

f(1.6) = (1 * 1.6^1 * e^(-1.6)) / 1 = 1.6 * e^(-1.6)

Therefore, the probability density function value at x=1.6 for a random variable x with a gamma distribution where α=2 and β=1 is:

f(1.6) = 1.6 * e^(-1.6) ≈ 0.33013

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The number of unique access keys that can be designed with the given numbers is 280 possible unique access keys.

This is a permutations problem which means it can be solved by the equation :

Number of permutations = n! / (n1! * n2! * ... * nk!)

Given the numbers, 1, 1, 1, 2, 3, 3, 3, 3, we can apply the formula to be :

Number of permutations = 8 ! / (3 ! x 1 ! x 4 !)

= 40, 320 / (6 x 1 x 24)

= 40, 320 / 144

= 280 possible access keys

In conclusion, a total of 280 possible unique access keys can be made.

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The indefinite integral is ∫ x / √(x^2 - 6x + 39) dx = √(x^2 - 6x + 39)/2 + C.

To complete the square in the denominator of the integrand, we need to add and subtract a constant:

x^2 - 6x + 39 = (x^2 - 6x + 9) + 30 = (x - 3)^2 + 30

So we can rewrite the integrand as:

x / √[(x - 3)^2 + 30]

Next, we can use the substitution u = (x - 3)^2 + 30 to simplify the integral. Then, du/dx = 2(x - 3), which means dx = du/(2(x - 3)). Making this substitution gives:

∫ x / √[(x - 3)^2 + 30] dx = 1/2 ∫ du/√u

Now, we can use the substitution v = √u, which means dv/dx = 1/(2√u) du/dx = 1/(2√u)(2(x - 3)) = (x - 3)/√u, and dx = 2v dv/(x - 3). Making this substitution gives:

1/2 ∫ du/√u = 1/2 ∫ dv = 1/2 v + C

Substituting back for v and u, we get:

1/2 ∫ x / √[(x - 3)^2 + 30] dx = 1/2 ∫ dv = 1/2 √[(x - 3)^2 + 30] + C

Therefore, the indefinite integral of x / √(x^2 - 6x + 39) dx is:

∫ x / √(x^2 - 6x + 39) dx = √(x^2 - 6x + 39)/2 + C

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The area Covered by the sod is 118017.13Sq ft.

The Area covered by Dirt is 7049.6 Sq feet.

First, perimeter for Fencing

= ¼ x 2 x π x 380 + 2 x 15 +2 x 380 + ¼ x 2 x π x 15

= 197.5π + 190π

= 1410.5 feet.

Now, for Grass

= π/4 x (380 - 6)² + 87 ² - π/4 × (87 + 30)² + 2 x 380 x 15 + π/4 x 15² - (3/4) x π x 10² - 25π

= 31528π + 18969

= 118017.13

So, The area Covered by the sod is about 118017.13Sq ft.

Now, Area covered by Dirt

= π/4 x 380 ² - π/4 x (380 - 6)² + π/4 (87 + 30)² - 87² + π100

= (18613π - 30276)/4

= 7049.6 Sq feet

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Answer: B. (x,y) → (2x - 4,2y-6)

Step-by-step explanation:

A transformation that preserves both distance and angle measure is called an isometry. An isometry preserves distance because the distance between any two points in the pre-image is the same as the distance between their corresponding points in the image. An isometry also preserves angle measure because the angle between any two intersecting lines in the pre-image is the same as the angle between their corresponding lines in the image.

Option (B) represents a transformation that preserves both distance and angle measure. This transformation is a combination of a horizontal and a vertical stretch (or compression) with a scale factor of 2 and a translation of 4 units to the right and 6 units down. Since a stretch (or compression) preserves angle measure, and a translation preserves distance and angle measure, this transformation preserves both distance and angle measure, and therefore, is an isometry.

Option (A) represents a horizontal stretch with a scale factor of 2 and a translation of 4 units to the left and 6 units down. This transformation does not preserve distance, since the horizontal distances are multiplied by a factor of 2, and it does not preserve angle measure, since the angles between intersecting lines are not necessarily preserved.

Option (C) represents a 90-degree rotation followed by a reflection across the x-axis, which preserves angle measure, but does not preserve distance, since the distances between corresponding points are not necessarily the same.

Option (D) represents a 90-degree counterclockwise rotation followed by a reflection across the y-axis, which preserves angle measure, but does not preserve distance, since the distances between corresponding points are not necessarily the same.

Therefore, the correct answer is option (B).

The value of the car now is approximately $8,920.09.

The value of the car can now be determined using the compound interest formula:

A = P * (1 - r)^n

Where

The beginning sum is $16,490 in this instance, the yearly interest rate is 13%, or 0.13 as a decimal, and the number of years is 5.

We thus have:

A = 16490 * (1 - 0.13)^5 = 16490 * 0.541 = $8920.09

Therefore, the value of the car now is approximately $8,920.09.

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The two solutions for sin(x) = -0.81 on 0 ≤ x < 2π are a ≈ -2.207 and b ≈ 3.077, with a < b.

To solve sin(x) = -0.81 on 0 ≤ x < 2π, we first need to find the reference angle. We know that sin is negative in the third and fourth quadrants, so we need to find the angle whose sine is positive and then add π to get the angle in the third quadrant and subtract π to get the angle in the fourth quadrant.
Using a calculator, we can find that the reference angle for sin^-1(0.81) is approximately 0.935 radians or 53.5 degrees. To find the solutions in the third quadrant, we add π to the reference angle, giving us x = π + 0.935 ≈ 3.077 radians or x ≈ 176.5 degrees. To find the solutions in the fourth quadrant, we subtract π from the reference angle, giving us x = 0.935 - π ≈ -2.207 radians or x ≈ -126.5 degrees.
Therefore, the two solutions for sin(x) = -0.81 on 0 ≤ x < 2π are a ≈ -2.207 and b ≈ 3.077, with a < b.

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Answer:

[tex]y \geqslant \frac{2}{3} x - 2[/tex]

[tex]y + 2 \geqslant \frac{2}{3} x[/tex]

[tex] \frac{2}{3}x - y \leqslant 2[/tex]

[tex]2x - 3y \leqslant 6[/tex]

The magnitude of an earthquake that has the following intensity.

(a) 1,000 times that of I0 , R is 3.

(b) 100,000 times that of I0, R is 5.

What is ritcher scale?

The logarithm of the wave amplitude measured by seismographs is used to calculate the earthquake's Richter magnitude; adjustments are made to account for variations in the distances between different seismographs and the earthquake's epi-centre.

a) I = 1000. I₀

R = log(I / I₀)

= log(1000 I₀ / I₀)

= log(1000)

= log 10³

(i.e., log xⁿ = n log x)

= 3 log 10

R = 3

b) I = 100000 I₀

R = log(I / I₀)

=  log(100000 I₀ / I₀)

= log(100000)

= log 10⁵

(i.e., log xⁿ = n log x)

= 5 log 10

R = 5

The magnitude of an earthquake that has the following intensity.

(a) 1,000 times that of I0 , R is 3.

(b) 100,000 times that of I0, R is 5.

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The probability that the sequence of rolls is 2, 6, 1, 4, 5 is 1/7776, or as a decimal rounded to four decimal places, it is approximately 0.0001.

To find the probability that the sequence of rolls is 2, 6, 1, 4, 5 when a fair 6-sided die is rolled five times, we can use the following steps:
1. Since there are 6 sides on a fair die, the probability of rolling any specific number is 1/6.
2. The probability of rolling a specific sequence of numbers is the product of the probabilities of rolling each number in that sequence.
3. In this case, the sequence is 2, 6, 1, 4, 5. The probability of rolling each number in this sequence is 1/6.
So, to calculate the probability of the sequence 2, 6, 1, 4, 5, we multiply the probabilities of each individual roll:

(1/6) * (1/6) * (1/6) * (1/6) * (1/6) = 1/7776

Rounded to four decimal places, the probability is approximately 0.0001. Therefore, the probability that the sequence of rolls is 2, 6, 1, 4, 5 is 0.0001, or 1/7776 as a fraction.

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Two different ways to write f dA as an iterated integral for the shaded region R. 1 + R 1, in the order dy dx and dx dy.

To write f dA as an iterated integral in two different ways for the shaded region R. 1 + R 1, we need to first determine the limits of integration for each variable.

If we start with the order dy dx, we can see that the shaded region is bounded by y = 0, y = 2, x = 1 and x = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dy dx
= ∫1^2 ∫0²-x f(x,y) dy dx + ∫2³ ∫0 f(x,y) dy dx
= ∫1^2 [∫0²-x f(x,y) dy] dx + ∫2³ [∫0 f(x,y) dy] dx
(Note: We split the integral into two parts based on the two different regions.)

Alternatively, if we switch the order to dx dy, we can see that the shaded region is bounded by x = 1, x = 2, y = x-1 and y = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dx dy
= ∫0 ∫x+1² f(x,y) dy dx + ∫1² ∫1 f(x,y) dx dy
= ∫0 [∫x+1² f(x,y) dy] dx + ∫1² [∫1 f(x,y) dx] dy
(Note: We split the integral into two parts based on the two different regions.)

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Two different ways to write f dA as an iterated integral for the shaded region R. 1 + R 1, in the order dy dx and dx dy.

To write f dA as an iterated integral in two different ways for the shaded region R. 1 + R 1, we need to first determine the limits of integration for each variable.

If we start with the order dy dx, we can see that the shaded region is bounded by y = 0, y = 2, x = 1 and x = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dy dx
= ∫1^2 ∫0²-x f(x,y) dy dx + ∫2³ ∫0 f(x,y) dy dx
= ∫1^2 [∫0²-x f(x,y) dy] dx + ∫2³ [∫0 f(x,y) dy] dx
(Note: We split the integral into two parts based on the two different regions.)

Alternatively, if we switch the order to dx dy, we can see that the shaded region is bounded by x = 1, x = 2, y = x-1 and y = 2. Therefore, we can write the integral as follows:

f dA = ∫∫R f(x,y) dx dy
= ∫0 ∫x+1² f(x,y) dy dx + ∫1² ∫1 f(x,y) dx dy
= ∫0 [∫x+1² f(x,y) dy] dx + ∫1² [∫1 f(x,y) dx] dy
(Note: We split the integral into two parts based on the two different regions.)

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The * values that make the solution a whole number are given as follows:

* = 4 or * = 9.

The divisibility rule for 5 states that a number is divisible by 5 if its ones digit (i.e., the digit in the units place) is either 0 or 5. In other words, if the number ends in 0 or 5, then it is divisible by 5.

The solution to the equation is obtained as follows:

5x = (516 + 49*)

x = (516 + 49*)/5

Hence it is needed one of these two following cases:

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To find the volume of the region in the first octant bounded by the coordinate planes, the plane y + z = 2, and the cylinder x = 4 − y^2, we need to first graph the given surfaces in 3D space.

The coordinate planes are the x-y, x-z, and y-z planes. In the first octant, these planes bound the region from below and on the sides.

The plane y + z = 2 is a plane that passes through the origin and intersects the y-z plane at y = 2 and z = 0, and the z-x plane at x = 2 and z = 0,The cylinder x = 4 − y^2 is a cylinder with radius 2 and centered at the origin, since it is a function of y^2 and only extends to y = 2 in the first octant.

To find the volume of the region bounded by these surfaces, we need to integrate over the region. We can do this by dividing the region into small rectangular prisms, and integrating over each prism.The limits of integration for x are 0 to 4 − y^2, the limits for y are 0 to 2, and the limits for z are 0 to 2 − y.
Therefore, the volume of the region is given by the triple integral: ∫∫∫ (dV) = ∫0^2 ∫0^(4-y^2) ∫0^(2-y) dz dxdy.

Evaluating the integral, we get: ∫∫∫ (dV) = ∫0^2 ∫0^(4-y^2) (2-y) dx dy
∫∫∫ (dV) = ∫0^2 (2-y)(4-y^2) dy
∫∫∫ (dV) = ∫0^2 8-4y^2-2y+ y^3 dy
∫∫∫ (dV) = [8y - 4y^3/3 - y^2 + y^4/4]0^2
∫∫∫ (dV) = 32/3, Therefore, the volume of the region in the first octant bounded by the coordinate planes, the plane y + z = 2, and the cylinder x = 4 − y^2 is 32/3 cubic units.

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Answer:

b) Dimensions of garden:
length = 10 feet
width = 3 feet

Step-by-step explanation:

I am only doing the part b. Part a is just a sketch of a rectangle with the dimensions computed

b) Find the dimensions of Amelia's garden

Let us use the variable L to represent the length and the variable W to represent the width of the garden

We are given that the length = 4 plus twice the width
In algebraic equation terms this would be
L = 4 + 2W

We are given that the area is 30 ft²
Area of a rectangle = LW
So
LW = 30

Substitute for L in terms of W:
(4 + 2W)W = 30
4W + 2W² = 30

Move 30 to the left and rearrange terms on the left
2W² + 4W - 30 = 0'

Divide by 2:
W² + 2W - 15 = 0

This is a quadratic equation that can be solved using factoring
Find the factors of -15 and see which of them when added will give a value of 2 which is the coefficient of W in the quadratic equation

Factors of -15 are
-15 1  => sum = 15 + 1 = - 14 X
-5 3  => sum = -5 + 3 = -2   X
5 -3  =>  sum = 5 + (-3) = 2  √

Given the correct factors we can rewrite the equation as
(W + 5)(W - 3) = 0

So either W + 5 = 0 or W - 3 =0

(If you multiply W + 5 by W - 3 you will get W² + 2W - 15)

Therefore the solutions to the quadratic equation are
W + 5 = 0   ==> W = -5  ; not possible, dimensions have to be positive
W - 3 = 0  ==> W = 3 ; this is the solution

So we have W, the width of the garden as 3 feet

Substitute W = 3 in the equation for length:
L = 4 + 2W

L = 4 + 2 x 3

L = 10

So length = 10 feet

The solution to the given boundary-value problem is y(x) = 2sin(pi*x) + x, where y(0) = 0 and y(1) = y'(1) = 0.

To solve the given boundary-value problem, we first write the differential equation in standard form

y'' + 7y = 7x

Next, we find the general solution of the homogeneous equation y'' + 7y = 0

The characteristic equation is r^2 + 7 = 0, which has roots r = ±√(7)i. Thus, the general solution of the homogeneous equation is

y_h(x) = c₁*cos(√(7)x) + c₂sin(√(7)*x)

where c₁ and c₂ are constants to be determined by the initial conditions.

Now, we find a particular solution of the non-homogeneous equation y'' + 7y = 7x

A particular solution of the non-homogeneous equation is y_p(x) = Ax + B, where A and B are constants. Substituting this into the differential equation, we get

0 + 7(Ax + B) = 7x

Solving for A and B, we get A = 1 and B = 0. Thus, a particular solution of the non-homogeneous equation is y_p(x) = x.

Therefore, the general solution of the given differential equation is

y(x) = c1*cos(√(7)x) + c2sin(√(7)*x) + x

Using the first initial condition y(0) = 0, we get

c1 = 0

Using the second initial condition y(1) = 0, y'(1) = 0, we get

c₂sin(√(7)) + 1 = 0

c₂sqrt(7)*cos(√(7)) = 0

Since c₂ cannot be zero, the second equation gives us cos(sqrt(7)) = 0, which implies sqrt(7) = (2n+1)*pi/2 for some integer n. Thus, the possible values of √(7) are

√(7) = pi/2, 3pi/2, 5pi/2, ...

Therefore, the general solution of the differential equation that satisfies the boundary conditions is

y(x) = (2/n)sin(npi*x) + x, where n is an odd integer.

In particular, the solution satisfying the given initial conditions is

y(x) = (2/1)sin(pix) + x = 2sin(pi*x) + x

Hence, the solution of the problem is y(x) = 2sin(pi*x) + x, where y(0) = 0 and y(1) = y'(1) = 0.

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Answer:

7

Step-by-step explanation:

Answer:

The system of equations is:

-5x + 9y = -9

5x - 8y = 4

The determinant of the coefficients is:

D = |-5 9|

| 5 -8|

D = (-5)(-8) - (9)(5) = 40 - 45 = -5

The determinant of x is found by replacing the x-coefficients with the constants:

Dx = |-9 9|

| 4 -8|

Dx = (-9)(-8) - (9)(4) = 72 - 36 = 36

The determinant of y is found by replacing the y-coefficients with the constants:

Dy = |-5 -9|

| 5 4|

Dy = (-5)(4) - (-9)(5) = -20 + 45 = 25

Using Cramer's Rule:

x = Dx/D = 36/-5 = -7.2

y = Dy/D = 25/-5 = -5

Therefore, the solution to the system is x = -7.2 and y = -5.

Hope this helps!

Answer:

Add a dot (Point A) 5 units to the left of point C, a dot (Point B) 7 units below point C, and a final dot (Point D) that is 5 units across from Point B

Step-by-step explanation:

Using the definition of a rectangle (4 right angles)
- Length is usually viewed as left to right

- Width is usually viewed as top to bottom

The sum of the series (x-y)^2 + x^2 + y^2 is 2x^2 - 2xy + 2y^2.

From the question, we have the following parameters that can be used in our computation:

(x-y)^2+x^2+y^2

The expression (x-y)^2 can be expanded as:

(x-y)^2 = x^2 - 2xy + y^2

Adding x^2 and y^2, we get:

(x-y)^2 + x^2 + y^2 = x^2 - 2xy + y^2 + x^2 + y^2

Combining like terms, we can simplify this expression to:

(x-y)^2 + x^2 + y^2 = 2x^2 - 2xy + 2y^2

Therefore, the sum of the series (x-y)^2 + x^2 + y^2 is 2x^2 - 2xy + 2y^2.

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Answer:

   A1 = 160 degrees

   A2 = 20 degrees

   B1 = 70 degrees

   C1 = 110 degrees

   C2 = 70 degrees

   D1 = 20 degrees

   AD = 10 cm

   AE = 5√5 cm

   AB = 8 cm

Step-by-step explanation:

To solve this problem, we can start by using the fact that the diagonals of a rectangle are equal in length and bisect each other. Therefore, we know that:

- BD = AC = 10cm

- AE = EC = BD/2 = 5cm

- AB = CD = sqrt(AC^2 + BC^2) = sqrt(10^2 + 8^2) = sqrt(164) ≈ 12.81cm

- AD = BC = 8cm

To find the angles A1, A2, B1, C1, C2, and D1, we can use the following relationships:

- A1 = 180 - D2 = 180 - 20 = 160 degrees

- A2 = 180 - A1 = 180 - 160 = 20 degrees

- B1 = C2 = D2 = 20 degrees

- C1 = 180 - B1 = 180 - 20 = 160 degrees

- D1 = 180 - C2 = 180 - 20 = 160 degrees

Therefore:

- A1 = 160 degrees

- A2 = 20 degrees

- B1 = C2 = D2 = 20 degrees

- C1 = D1 = 160 degrees

Note that angles A1, C1, and D1 are all equal, as are angles A2, B1, and C2, because opposite angles in a rectangle are equal.

Finally, to find AD, we can use the Pythagorean theorem:

- AD = BC = 8cm

And to find AE, we can use the fact that diagonals bisect each other:

- AE = EC = BD/2 = 5cm

Therefore:

- AD = 8cm

- AE = 5cm

- AB ≈ 12.81cm

- A1 = 160 degrees

- A2 = 20 degrees

- B1 = C2 = D2 = 20 degrees

- C1 = D1 = 160 degrees