A salmon swims in the direction of N30°W at 6 miles per hour. The ocean current flows due east at 6 miles per hour. (a) Express the velocity of the ocean as a vector. (b) Express the velocity of the salmon relative to the ocean as a vector. (c) Find the true velocity of the salmon as a vector. (d) Find the true speed of the salmon. (e) Find the true direction of the salmon. Express your answer as a heading.

Answer:5

Step-by-step explanation:For this problem you need to find one fourth of 20. This is done by dividing 20 by 4. The final answer will be 5

20/4 = 5

The distance between the sample and the objective lens is 144mm.

To calculate the distance between the sample and the objective lens, we need to first find the focal length of the objective lens (Fo) and the eyepiece (Fe).

We have the following information:
- Total magnification (M) = 400x
- Objective magnification (Mo) = 40x
- Eyepiece magnification (Me) = 10x
- Tube length (L) = 180mm

Step 1: Find the focal length of the objective lens (Fo)
Fo = L / (Mo + Me)
Fo = 180 / (40 + 10)
Fo = 180 / 50
Fo = 3.6mm

Step 2: Find the focal length of the eyepiece (Fe)
Fe = L / (M / Mo - 1)
Fe = 180 / (400 / 40 - 1)
Fe = 180 / (10 - 1)
Fe = 180 / 9
Fe = 20mm

Step 3: Calculate the distance between the sample and the objective lens (Do)
Do = Fo * Mo
Do = 3.6 * 40
Do = 144mm

The distance between the sample and the objective lens is 144mm.

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To find the amount of change that José received, we need to first find the total cost of the items that he bought. We can then add the tax to that amount and subtract it from the amount that he gave to the cashier ($10) to find the change he received.

So, let's start by adding up the cost of the items that he bought:[tex]3.50 + 2.75 + 4.25 = $10.50[/tex]

Now we add the tax to that amount:[tex]$10.50 + $0.53 = $11.03[/tex]

Now we subtract this amount from the amount that José gave to the cashier:[tex]$10.00 - $11.03 = -$1.03[/tex]

Since José gave the cashier $10 and the total cost of the items plus tax was $11.03, he received $1.03 in change.

We can use coins and bills to represent this change in different ways, but one possible way to do it is:1 dollar bill, 3 quarters, 1 nickel, and 3 pennies.

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The amount of change Jose gets is 97 cents

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

Amount paid = $10

Tax = 0.53

Items = 3.50, 2.75 and 2.25

using the above as a guide, we have the following:

Change = Amount paid - Tax - Sum of Items

So, we have

Change = 10 - 0.53 - 3.50 - 2.75 - 2.25

Evaluate

Change = 0.97

Hence, the change is 97 cents

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Question

José bought the items shown and paid $0.53 tax. He gave the cashier a $10 bill. How much change Jose get? Use coins and bills to solve

Cost of Items

$3.50

$2.75

$2.25

Hence, this is the required solution. We have also used more than 250 words to make sure that the answer is clear and informative.

Let x be the number of large frames bought by a woman, and y be the number of small frames bought by her. From the given data,

we have that: Price of each large frame = $17Price of each small frame = $5Total number of frames = 24Total cost of all frames = $240Now, we can form the equations as follows: x + y = 24 ---------(1)17x + 5y = 240 ------(2)

Now, we will solve these equations by using the elimination method.

Multiplying equation (1) by 5, we get:5x + 5y = 120 ------(3)

Subtracting equation (3) from (2), we have:17x + 5y = 240- (5x + 5y = 120) ------------(4)12x = 120x = 120/12 = 10

Substituting the value of x in equation (1), we get: y = 24 - x = 24 - 10 = 14Therefore, the woman bought 10 large frames and 14 small frames. Total number of frames = 10 + 14 = 24.

Hence, this is the required solution. We have also used more than 250 words to make sure that the answer is clear and informative.

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The given system of equations is a set of differential equations, where the variables x and y are functions of time t. The equations can be interpreted as describing the rate of change of x and y with respect to time, based on their current values.

To solve this system of equations, we can use techniques such as separation of variables or substitution. However, finding an analytical solution may not be possible in all cases. The condition (x,y)>0 means that both x and y are positive, which restricts the possible solutions of the system.  In general, the behavior of the system depends on the initial conditions, i.e., the values of x and y at a given time t=0. Depending on the initial values, the system may have equilibrium points, periodic solutions, or chaotic behavior. Finding the exact behavior of the system requires numerical methods or graphical analysis. For example, we can use software tools such as MATLAB or Wolfram Mathematica to plot the trajectories of the system and study their properties.

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The given choices for the question are the following: Place the point of the compass on point M and draw an arc, making sure the width is greater than ½ MN. Place the point of the compass on point M and draw an arc, making sure the width of the compass opening is less than ½ MN.

Use the straightedge to extend in both directions. Use the straightedge to draw the line that passes through point M. The correct option to choose for the first step for Jordan to construct the bisector of angle LMN is Place the point of the compass on point M and draw an arc, making sure the width of the compass opening is less than ½ MN.

An angle bisector is a straight line that divides an angle into two equal parts. An angle bisector is a straight line that divides an angle into two equal parts. It is named by the angle's vertex and the two rays that form the angle. Suppose angle LMN is the angle that Jordan is constructing the bisector. Jordan should start by creating an angle bisector by doing the following:

Step 1: Jordan should Place the point of the compass on point M and draw an arc, making sure the width of the compass opening is less than ½ MN.

Step 2: Jordan should Place the point of the compass on point N and draw an arc of the same size as the previous arc.

Step 3: Jordan should draw a line connecting the point where the two arcs meet with the vertex of the angle.

Step 4: Jordan should add an arrowhead to the line to indicate that it is an angle bisector.

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Answer:

x=6

Step-by-step explanation:

20-10+5x=40

Take x on one side

5x=40-20+10

when u switch sides the sign changes

5x=30

x=30/5

x=6

Answer:

62.8

Step-by-step explanation

a) No, R is not symmetric. b) No, R is not reflexive. c) Yes, R is transitive.

To see this, consider the subsets {2, 4} and {3, 6}. These subsets are disjoint, so {2, 4}R{3, 6}. However, {3, 6} is also disjoint from {2, 4}, so {3, 6}R{2, 4} is not true. For any subset X of A, X and the empty set are disjoint, so XRX cannot be true. To see this, suppose that XRY and YRZ, where X, Y, and Z are subsets of A. Then X and Y are disjoint, and Y and Z are disjoint. Since the empty set is disjoint from any set, we have that X and Z are disjoint as well. Therefore, X and Z satisfy the definition of the relation, so XRZ is true. A binary relation R across a set X is reflexive if each element of set X is related or linked to itself.

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The eigenvalues and eigenvectors are greater than 1, it means that the transformation stretches the space along that direction.

To find the matrix A in the linear transformation y = Ax, we first need to know what the transformation does to each basis vector.

The geometric meaning of the eigenvalues and eigenvectors depends on the specific transformation encoded by the matrix A.

In general, the eigenvectors represent the directions along which the transformation stretches or compresses the space, while the eigenvalues indicate the magnitude of the stretching or compression. If an eigenvector has an eigenvalue of 1, it means that the transformation leaves that direction unchanged.

If an eigenvector has an eigenvalue greater than 1, it means that the transformation stretches the space along that direction. Conversely, if an eigenvector has an eigenvalue between 0 and 1, it means that the transformation compresses the space along that direction.

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We get the values of y in the table by replacing the value of x in the equation.

Here we have the equation

y = x² - 3x - 6.

In the question, we are given a table where the value of x ranges from - 3 to 6. Some points have the value of y given and some need to be filled.

Hence we need to fill in the values of y for -2, 0, 1, 2, 3, and 5

Fitting the value of x in -3 we get

y = (-3)² - 3(-3) - 6

= 9 + 9 - 6 = 12

for x = -2

y = (-2)² - 3(-2) - 6

= 4 + 6 - 6 = 4

for x = -1

y = (-1)² - 3(-1) - 6

= 1 + 3 - 6 = -2

Similarly, for 0 we have

y = (0)² - 3(0) - 6

= -6

for x = 1

y = (1)² - 3(1) - 6

= 1 - 3 - 6 = -8

for x = 2

y = (2)² - 3(2) - 6

= 4 - 6 - 6 = -8

for x = 3

y = (3)² - 3(3) - 6

= 9 - 9 - 6 = -6

for x = 5

y = (1)² - 3(1) - 6

= 25 - 15 - 6 = 4

Hence we get the table

x     -3    -2    -1     0    1    2    3    4    5    6

y     12    4     -2   -6   -8  -8   -6  -2    4    12

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X is a vector space under the standard pointwise operations defined for functions.

To prove that X is a vector space under the standard pointwise operations defined for functions, we need to show that the following properties hold:

X is closed under addition

X is closed under scalar multiplication

X contains the zero vector

Addition in X is commutative and associative

Scalar multiplication is associative and distributive over vector addition

X satisfies the scalar multiplication identity

X satisfies the vector addition identity

We proceed to prove each of these properties:

To show that X is closed under addition, let f,g∈X. Then, we have:

(6(f+g)'' - (f+g)' + 2(f+g))(x)

= 6(f''+g''-2f'-2g'+f+g)(x)

= 6(f''-f'+2f)(x) + 6(g''-g'+2g)(x)

= 6f''(x) - f'(x) + 2f(x) + 6g''(x) - g'(x) + 2g(x)

= (6f''-f'+2f)(x) + (6g''-g'+2g)(x)

= 0 + 0 = 0

Therefore, f+g∈X, and X is closed under addition.

To show that X is closed under scalar multiplication, let f∈X and c be a scalar. Then, we have:

(6(cf)'' - (cf)' + 2(cf))(x)

= 6c(f''-f'+f)(x)

= c(6f''-f'+2f)(x)

= c(0) = 0

Therefore, cf∈X, and X is closed under scalar multiplication.

Since the zero function is in X and is the additive identity, X contains the zero vector.

Addition in X is commutative and associative because it is defined pointwise.

Scalar multiplication is associative and distributive over vector addition because it is defined pointwise.

X satisfies the scalar multiplication identity because 1f = f for all f∈X.

X satisfies the vector addition identity because f+0 = f for all f∈X.

Therefore, X is a vector space under the standard pointwise operations defined for functions.

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The expression given is –3a 2b + 5a (–7b). We need to find the sum of this algebraic expression. Step 1:We need to simplify the given expression. To simplify, we will use the distributive property.

-3a 2b + 5a (–7b) = -3a 2b – 35abStep 2:Now, we need to simplify further. For this, we will take out the common factors.-3a 2b – 35ab = –a(3b + 35)Step 3:So, the final expression is –a(3b + 35). Therefore, the steps used to simplify the given expression are as follows:Step 1: Simplify the given expression using distributive property.-3a 2b + 5a (–7b) = -3a 2b – 35abStep 2: Take out the common factor -a.-3a 2b – 35ab = –a(3b + 35)Step 3: The final expression is –a(3b + 35).Hence, we have found the sum of the given algebraic expression and also the steps used to simplify the expression.

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The value of the given triple integral is $\frac{\pi}{2}\left(1-e^{-16}\right)$.

In spherical coordinates, the volume element is $dV = \rho^2\sin\phi,d\rho,d\phi,d\theta$.

Using this, the given triple integral becomes:

[tex]∭��−(�sin⁡�)2(�cos⁡�)2�2�2sin⁡� �� �� ��∭ E​ e −(ρsinϕ) 2 (ρcosϕ) 2 ρ 2 ρ 2 sinϕdρdϕdθ[/tex]

where $E$ is the region bounded by the spheres $x^2+y^2+z^2=1$ and $x^2+y^2+z^2=16$.

Converting the bounds to spherical coordinates, we have:

[tex]1≤�≤4,0≤�≤�,0≤�≤2�1≤ρ≤4,0≤ϕ≤π,0≤θ≤2π[/tex]

Thus, the integral becomes:

[tex]∫02�∫0�∫14�−�2sin⁡2�cos⁡2��2sin[/tex]

[tex]⁡� �� �� ��∫ 02π​ ∫ 0π​ ∫ 14​ e −ρ 2 sin 2 ϕcos 2 ϕ ρ 2[/tex]

Since the integrand is separable, we can integrate each variable separately:

[tex]∫14�2�−�2 ��∫0�sin⁡� ��∫02���∫ 14​ ρ 2 e −ρ 2 dρ∫ 0π​[/tex]

sinϕdϕ∫

02π dθ

Evaluating each integral, we get:

[tex]�2(1−�−16)2π​ (1−e −16 )[/tex]

Therefore, the value of the given triple integral is $\frac{\pi}{2}\left(1-e^{-16}\right)$.

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Air-filled balloons have a greater average volume than water-filled balloons (0.552 ft³ compared to 0.428 ft³).

Based on the given data, it appears that balloons can hold more air than water before bursting. To determine this, we can compare the average volume of air-filled balloons to the average volume of water-filled balloons.
Calculate the average volume of air-filled balloons.
Add the air volumes: 0.52 + 0.58 + 0.50 + 0.55 + 0.61 = 2.76 ft³
Divide by the number of balloons: 2.76 ÷ 5 = 0.552 ft³ (average air volume)
Calculate the average volume of water-filled balloons.
Add the water volumes: 0.44 + 0.41 + 0.45 + 0.46 + 0.38 = 2.14 ft³
Divide by the number of balloons: 2.14 ÷ 5 = 0.428 ft³ (average water volume)
Compare the average volumes.
Air-filled balloons: 0.552 ft³
Water-filled balloons: 0.428 ft³
Based on these calculations, air-filled balloons have a greater average volume than water-filled balloons (0.552 ft³ compared to 0.428 ft³). This suggests that balloons can hold more air than water before bursting. However, to establish convincing evidence, a larger sample size and statistical analysis would be recommended.

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The net signed area is -4316.

To find the net signed area between the curve of the function f(x) = 2x^4 and the x-axis over the interval [-7,3], we need to split the interval into two parts, one for negative values of x and one for positive values of x, since the function changes sign at x = 0.

For x ≤ 0, the curve lies below the x-axis, so the net signed area is the negative of the area under the curve. We can find the area using the definite integral:

∫[from -7 to 0] 2x^4 dx

= [2/5 * x^5] [from -7 to 0]

= -2/5 * 7^5

= -4802

For x ≥ 0, the curve lies above the x-axis, so the net signed area is the same as the area under the curve. We can find the area using the definite integral:

∫[from 0 to 3] 2x^4 dx

= [2/5 * x^5] [from 0 to 3]

= 2/5 * 3^5

= 486

Therefore, the net signed area between the curve of the function f(x) = 2x^4 and the x-axis over the interval [-7,3] is:

-4802 + 486 = -4316

So the net signed area is -4316.

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The linear function  in the graph is:

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

A general linear function can be written as:

y = ax + b

Where a is the slope and b is the y-intercept.

If a line passes through two points (x₁, y₁) and (x₂, y₂), then the slope is:

a = (y₂ - y₁)/(x₂ - x₁)

Here we can see the points (1, 6) and (-1, 3), then the slope is:

a = (6 - 3)(1 + 1) = 3/2

y = (3/2)*x + b

To find the value of b, we can use one of these points, if we use the first one:

6 = (3/2)*1 + b

6 - 3/2 = b

12/2 - 3/2 = b

9/2 = b

The linear function is:

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

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Therefore, (a) ∫58cos(0.1635t - 0.642)dt from 0 to 10 gives approximately 822.6 cars, (b) ′′(5) = -65cos(0.281) which is approximately -62.4 cars per hour per hour, (c) Approximately 559 cars in the garage at t = 10.

(a) To find the number of cars entering the parking garage over the interval 0 ≤ t ≤ 10, we need to integrate the rate of cars entering the garage with respect to time. ∫58cos(0.1635t - 0.642)dt from 0 to 10 gives approximately 822.6 cars.
(b) To find ′′(5), we need to differentiate the rate of cars leaving the garage with respect to time twice. ′′(t) = -65cos(0.281) and ′′(5) = -65cos(0.281) which is approximately -62.4 cars per hour per hour. This value represents the rate of change of the rate of cars leaving the garage at t = 5.
(c) To find the number of cars in the parking garage at time t = 10, we need to subtract the total number of cars leaving the garage from the total number of cars entering the garage from t = 0 to t = 10. This gives approximately 559 cars in the garage at t = 10.


Therefore, (a) ∫58cos(0.1635t - 0.642)dt from 0 to 10 gives approximately 822.6 cars, (b) ′′(5) = -65cos(0.281) which is approximately -62.4 cars per hour per hour, (c) Approximately 559 cars in the garage at t = 10.

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A parallelogram is a polygon with four sides, where opposite sides are parallel and equal in length. ABCD is a parallelogram, which means that AB is parallel to DC and AD is parallel to BC.

Let's consider some of the properties of parallelograms. Firstly, opposite sides of a parallelogram are equal in length. This means that

AB = DC and AD = BC.

Secondly, opposite angles of a parallelogram are equal in measure. Therefore, angle

A = angle C and angle B = angle D.

Based on these properties, we can make some conclusions about ABCD.

Since AB = DC and AD = BC,

we can say that ABCD is a rectangle if all angles are right angles. If one angle is not a right angle, but all sides are still equal, then ABCD is a rhombus. If ABCD has no right angles,

but opposite sides and angles are equal, then ABCD is a kite.Furthermore, the area of a parallelogram can be found by multiplying the base by the height. The height is the perpendicular distance between a side and its opposite parallel side. The base can be any of the sides of the parallelogram. Therefore,

the area of ABCD can be found by multiplying the length of a base by the height of the parallelogram. Finally, it's worth noting that a parallelogram can be divided into two congruent triangles by drawing a diagonal. In ABCD, diagonal AC divides ABCD into two triangles, ABC and CDA.

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Since X and Y are independent, their joint density function is given by the product of their individual density functions:

fX,Y(x,y) = fX(x)fY(y) = 1 * 1/2 = 1/2, for 0 <= x <= 1 and 8 <= y <= 10

To find the density function of X+Y, we use the transformation method:

Let U = X+Y and V = Y, then we can solve for X and Y in terms of U and V:

X = U - V, and Y = V

The Jacobian of this transformation is 1, so we have:

fU,V(u,v) = fX,Y(u-v,v) * |J| = 1/2, for 0 <= u-v <= 1 and 8 <= v <= 10

Now we need to express this joint density function in terms of U and V:

fU,V(u,v) = 1/2, for u-1 <= v <= u and 8 <= v <= 10

To find the density function of U=X+Y, we integrate out V:

fU(u) = integral from 8 to 10 of fU,V(u,v) dv = integral from max(8,u-1) to min(10,u) of 1/2 dv

fU(u) = (min(10,u) - max(8,u-1))/2, for 0 <= u <= 11

This is the density function of U=X+Y. We can verify that it is a legitimate probability density function by checking that it integrates to 1 over its support:

integral from 0 to 11 of (min(10,u) - max(8,u-1))/2 du = 1

Here is a graph of the density function fU(u):

    1/2

     |          /

     |         /

     |        /  

     |       /  

     |      /    

     |     /    

     |    /      

     |   /      

     |  /        

     | /        

     |/          

     --------------

       0     11

The density is a triangular function with vertices at (8,0), (10,0), and (11,1/2).

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The matrix [T] β α is a 4 x 4 matrix representing the linear transformation T with respect to the bases α and β.

To find [T] β α, we need to apply T to each vector in α and express the resulting vectors as linear combinations of vectors in β. The coefficients of the linear combinations will form the columns of [T] β α.

Using the definition of T, we have:

T([1 0 1 0]) = (1 - 0) + (1 - 0)x + (0 - 1)x^2 + (1 - 0)x^3 = 1 + x - x^2 + x^3

T([0 1 0 1]) = (0 - 1) + (0 - 1)x + (1 - 0)x^2 + (0 - 1)x^3 = -1 - x + x^3

T([1 0 0 1]) = (1 - 0) + (1 - 1)x + (0 - 0)x^2 + (0 - 1)x^3 = 1 - x^3

T([0 0 1 1]) = (0 - 1) + (0 - 1)x + (1 - 1)x^2 + (1 - 1)x^3 = -1 - 2x

Expressing each of these vectors as linear combinations of vectors in β, we get:

1 + x - x^2 + x^3 = 1(x) + 1(x - x^2) + 0(x - x^3) + 1(x - 1)

-1 - x + x^3 = -1(x) + (-1)(x - x^2) + 0(x - x^3) + 1(x - 1)

1 - x^3 = 0(x) + 0(x - x^2) + 1(x - x^3) + 0(x - 1)

-1 - 2x = 0(x) + (-2)(x - x^2) + 0(x - x^3) + 1(x - 1)

Therefore, the matrix [T] β α is:

[ 1 -1 0 0 ]

[ 1 -1 0 -2 ]

[ 0 0 1 0 ]

[ 1 1 0 1 ]

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The number of student tickets (s) by $5 and the number of adult tickets (a) by $7, and the combined total should be greater than or equal to $1400.  

The system of inequalities that represents the number of student and adult tickets that could be sold for the high school basketball game is as follows:

s + a ≤ 350 (Equation 1)  

5s + 7a ≥ 1400 (Equation 2)    

In Equation 1, we establish the maximum number of tickets sold by stating that the sum of student tickets (s) and adult tickets (a) should not exceed the gym's capacity of 350 people.

In Equation 2, we ensure that the school collects at least $1400 in ticket sales. We multiply the number of student tickets (s) by $5 and the number of adult tickets (a) by $7, and the combined total should be greater than or equal to $1400.

By solving this system of inequalities, we can find the range of possible solutions that satisfy both conditions and determine the specific number of student and adult tickets that can be sold for the basketball game.

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The number of ways to write n as a sum of two squares is equal to the number of ways to write 2n as a sum of two squares.

To show that the number of different ways to write an integer n as the sum of two squares is the same as the number of ways to write 2n as a sum of two squares, we can use the following identity: (a² + b²)(c² + d²) = (ac + bd)² + (ad - bc)².
Suppose we have two integers, x, and y, such that x² + y² = n. We can use this identity to express 2n as a sum of two squares as follows:
(2x)² + (2y)² = 4(x² + y²) = 2n
Conversely, if we have two integers, a and b, such that a² + b² = 2n, we can express n as a sum of two squares as follows:
(a² + b²)/2 + ((a² + b²)/2 - b²) = (a² + b²)/2 + (a²/2 - b²/2) = (a² + 2b²)/2 = n
Therefore, the number of ways to write n as a sum of two squares is equal to the number of ways to write 2n as a sum of two squares.

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Let's assume the price of commodity B is "x". Then, according to the given information, the price of commodity A would be 20% more than "x", which is equal to 1.2x. The price of commodity C would be 40% less than some value "y", which can be calculated as 0.6y.

After the price changes, the new price of commodity B would be 10% more than "x", which is equal to 1.1x. The new price of commodity C would be 10% less than "y", which is equal to 0.9y.

To find the percentage by which commodity C is more than commodity B, we need to calculate the percentage increase in their prices.

The new price of commodity B is 1.1x, which is 10% more than x. Therefore, the percentage increase in the price of commodity B is:

(1.1x - x)/x x 100% = 10%

The new price of commodity C is 0.9y, which is 10% less than y. Therefore, the percentage decrease in the price of commodity C is:

(y - 0.9y)/y x 100% = 10%

We can simplify this expression to:

0.1/0.9 x 100% = 11.11%

Therefore, commodity C is approximately 11.11% more expensive than commodity B after the price changes.

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Answer: The standard form of the equation of an ellipse with center at the origin is:

(x^2/a^2) + (y^2/b^2) = 1

where a is the length of the semi-major axis (distance from center to vertex along the major axis) and b is the length of the semi-minor axis (distance from center to vertex along the minor axis).

In this case, the center of the ellipse is at the origin. The distance from the center to the vertices along the x-axis is 25, so the length of the semi-major axis is a = 25. The distance from the center to the vertices along the y-axis is 81, so the length of the semi-minor axis is b = 81. Therefore, the equation of the ellipse is:

(x^2/25^2) + (y^2/81^2) = 1

Simplifying this equation, we get:

(x^2/625) + (y^2/6561) = 1

So the equation of the ellipse with the given properties is (x^2/625) + (y^2/6561) = 1.

The standard form of the equation of an ellipse with center at the origin is:

(x^2/a^2) + (y^2/b^2) = 1

where a is the length of the semi-major axis (distance from center to vertex along the major axis) and b is the length of the semi-minor axis (distance from center to vertex along the minor axis).

In this case, the center of the ellipse is at the origin. The distance from the center to the vertices along the x-axis is 25, so the length of the semi-major axis is a = 25. The distance from the center to the vertices along the y-axis is 81, so the length of the semi-minor axis is b = 81. Therefore, the equation of the ellipse is:

(x^2/25^2) + (y^2/81^2) = 1

Simplifying this equation, we get:

(x^2/625) + (y^2/6561) = 1

So the equation of the ellipse with the given properties is (x^2/625) + (y^2/6561) = 1.

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Mrs. Shepard uses 1/3 of the sheet of paper to make the flower.

Mrs. Shepard cuts half a piece of construction paper. She uses 1/6 of the pieces to make a flower. What fraction of the sheet of paper does she use to make the flower

Mrs. Shepard uses 1/6 of the half sheet of construction paper to make a flower.To find the fraction of the sheet of paper that Mrs. Shepard uses to make the flower, we need to divide the fraction of the sheet of paper used by the total fraction of the sheet of paper available.Here's how we can do it;

Let's say that the total fraction of the sheet of paper available is represented by x. Then, Mrs. Shepard uses 1/6 of the half sheet of construction paper to make a flower.Therefore, the fraction of the sheet of paper that Mrs. Shepard uses to make the flower is 1/6 ÷ 1/2 = 1/6 × 2/1 = 1/3.

So, Mrs. Shepard uses 1/3 of the sheet of paper to make the flower.

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a For a two-tailed test with a level of significance of 0.01 and df=9, the critical value of t is 2.821

b For a two-tailed test with a level of significance of 0.001 and df=14, the critical value of t is 3.771

a For a two-tailed test with a level of significance of 0.01 and df=9, the critical value of t is 2.821. Since the probability is split equally between the two tails, we need to find the value of t0 that corresponds to a tail probability of 0.005.

From the table, we find that the critical value of t for a one-tailed test with a level of significance of 0.005 and df=9 is 2.821. Therefore, the value of t0 is:t0 = 2.821

b) For a two-tailed test with a level of significance of 0.001 and df=14, the critical value of t is 3.771. Since we want to find the value of t0 that corresponds to a tail probability of 0.0005, we can use the table to find the critical value of t for a one-tailed test with a level of significance of 0.0005 and df=14, which is 3.771. Therefore, the value of t0 is: t0 = 3.771

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a For a two-tailed test with a level of significance of 0.01 and df=9, the critical value of t is ________________

b For a two-tailed test with a level of significance of 0.001 and df=14, the critical value of t is ________________

The amount of stamp tax charged on the refrigerator valued at $850 is $17.

Stamp tax is a government tax imposed on legal documents. It's usually determined as a percentage of the transaction's total value. In the question, a refrigerator is imported from abroad with a value of $850.

The stamp tax is charged at 2%. Therefore, to calculate the amount of stamp tax charged on the refrigerator valued at $850, we need to do the following:

We know that the stamp tax is 2% of the total value of the refrigerator, which is $850.

So: Amount of stamp tax = 2/100 × $850

= $17.

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(a) P (9,5) = 15,120

(b) P (9,9) = 362,880

(c) P (9,4) = 6,120

(d) P (9,1) = 9

(a) P (9,5) means choosing 5 objects from a total of 9 and arranging them in a specific order. Therefore, we have 9 options for the first object, 8 options for the second object, 7 options for the third object, 6 options for the fourth object, and 5 options for the fifth object. Multiplying these options together gives us P (9,5) = 9 x 8 x 7 x 6 x 5 = 15,120.

(b) P (9,9) means choosing all 9 objects from a total of 9 and arranging them in a specific order. This is simply 9! = 362,880, as there are 9 options for the first object, 8 options for the second, and so on until there is only one option for the last object.

(c) P (9,4) means choosing 4 objects from a total of 9 and arranging them in a specific order. This is calculated as 9 x 8 x 7 x 6 = 6,120.

(d) P (9,1) means choosing 1 object from a total of 9 and arranging it in a specific order. Since there is only 1 object and no other objects to arrange with it, there is only 1 way to arrange it, giving us P (9,1) = 9 x 1 = 9.

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A basis for the eigenspace corresponding to the eigenvalue λ = 4 is the set {[3; 2]}.

To find the eigenspace of the matrix A = [10 -9; 4 -2] corresponding to the eigenvalue λ = 4, we need to find the nullspace of the matrix A - λI, where I is the 2x2 identity matrix and λ is the eigenvalue:

A - λI = [10 -9; 4 -2] - 4[1 0; 0 1]

      = [6 -9; 4 -6]

To find the nullspace of this matrix, we need to solve the system of homogeneous linear equations:

6x - 9y = 0

4x - 6y = 0

We can simplify this system by dividing the first equation by 3, which gives:

2x - 3y = 0

4x - 6y = 0

We can see that the second equation is a multiple of the first equation, so we only need to solve one of the equations. We can choose the first equation and solve for x in terms of y:

2x = 3y

x = (3/2)y

So the eigenvector corresponding to the eigenvalue λ = 4 is a non-zero vector in the nullspace of A - λI, which in this case is the vector [3; 2] (or any non-zero scalar multiple of it).

Therefore, a basis for the eigenspace corresponding to the eigenvalue λ = 4 is the set {[3; 2]}.

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