Suppose f: R → R is a continuous function which can be uniformly approximated by polynomials on R. Show that f is itself a polynomial. - Pm: Assuming |Pn(x) – Pm(x)| < ɛ for all x E R, (Hint: If Pn and Pm are polynomials, then so is Pn what does that tell you about Pn – Pm? Sub-hint: how do polynomials behave at infinity?)

The number of triangles that can be drawn is given by the combination "12 choose 3," which is equal to 220.

To understand why the number of triangles formed is given by "12 choose 3," we consider the concept of combinations. In general, the number of ways to choose r items from a set of n items is denoted by "n choose r" and is given by the formula n! / (r! * (n-r)!), where ! represents the factorial function.

In this case, we have 12 points, and we want to choose 3 points to form a triangle. Hence, the number of triangles is given by "12 choose 3," which can be calculated as:

12! / (3! * (12-3)!) = 12! / (3! * 9!) = (12 * 11 * 10) / (3 * 2 * 1) = 220.

Therefore, there are 220 triangles that can be drawn by connecting 12 non-collinear points.

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The best reason for [tex]8^n^2[/tex] diverging is that the term [tex]8^n^2[/tex] grows infinitely large as n approaches infinity. As n increases, the exponent n^2 becomes larger and larger, causing the term [tex]8^n^2[/tex] to become increasingly larger. Therefore, the series [tex]8^n^2[/tex] does not approach a finite value and diverges.

The statement "[tex]3^n^2 - 1 > n + 1[/tex], for all n on the interval (1, 0)" is not a valid reason for the divergence of [tex]8^n^2[/tex]. This inequality is unrelated to the given series and does not provide any information about its convergence or divergence.

The statement "lim a_n as n approaches infinity = 0" is also not a valid reason for the divergence of [tex]8^n^2[/tex]. The limit of a series approaching zero does not necessarily imply that the series itself diverges.

The statement "lim a_n as n approaches 1 does not exist" is not a valid reason for the divergence of [tex]8^n^2[/tex]. The limit not existing at a specific value does not necessarily indicate the divergence of the series. Overall, the best reason for the divergence of [tex]8^n^2[/tex] is that the term [tex]8^n^2[/tex]grows infinitely large as n approaches infinity, causing the series to diverge.

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To find the number of distinct words that can be made using all the letters from the word "EXAMINATION" without the occurrence of "AA," we can use the concept of permutations with restrictions.

The word "EXAMINATION" has a total of 11 letters, including 2 "A"s. Without any restrictions, the number of distinct words that can be formed is given by the permutation formula, which is n! / (n1! * n2! * ... * nk!), where n is the total number of letters and n1, n2, ..., nk represent the number of occurrences of each repeated letter.

In this case, we have 11 letters with 2 "A"s. However, we need to subtract the number of words where "AA" occurs. To do this, we treat "AA" as a single entity, reducing the number of available "letters" to 10.

Using the permutation formula, the number of distinct words without the occurrence of "AA" can be calculated as 10! / (2! * 2! * 1! * 1! * 1! * 1! * 1! * 1!).

Simplifying this expression gives us the answer.

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The T6(derivative) for the function is T6 ≈ 264.000000 and S12 ≈ 1400.000000

Let's have detailed explanation:

For T6, the approximation can be calculated as:

T6 = (1/3)*x^3 + (1/2)*x^2 + x at x=6

T6 = (1/3)*(6^3) + (1/2)*(6^2) + 6

T6 ≈ 264.000000.

For S12, the approximation can be calculated as:

S12 = (1/3)*x^3 + (1/2)*x^2 + x at x=12

S12 = (1/3)*(12^3) + (1/2)*(12^2) + 12

S12 ≈ 1400.000000.

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dθ/dr is equal to 4r.  The expression dθ/dr represents the derivative of the angle θ with respect to the variable r.

To show that the function f(x, y) is discontinuous at (0, 0), we need to demonstrate that either the limit of f(x, y) as (x, y) approaches (0, 0) does not exist or that the limit is different from the value of f(0, 0).

Unfortunately, the function f(x, y) you provided (represented by **) is missing, so I am unable to determine its specific form or analyze its continuity properties. Please provide the function so that I can assist you further.

Let w = xy, where x = cos(t) and y = sin(t). We need to find dw/dt at t = π/2.

First, express w in terms of t:

w = xy = cos(t) * sin(t) = (1/2) * sin(2t).

Now, differentiate w with respect to t:

dw/dt = d/dt[(1/2) * sin(2t)].

Using the chain rule, we have:

dw/dt = (1/2) * d/dt[sin(2t)].

Applying the derivative of sin(2t), we get:

dw/dt = (1/2) * 2 * cos(2t) = cos(2t).

Finally, substitute t = π/2 into the expression for dw/dt:

dw/dt = cos(2(π/2)) = cos(π) = -1.

Therefore, dw/dt at t = π/2 is -1.

Let z = 4e^ln(y), where x = ln(r * cos(θ)) and y = r * sin(θ). We need to find dz/dr at (2, 4).

First, express z in terms of r and θ:

z = 4e^ln(r * sin(θ)).

Since e^ln(u) = u for any positive u, we can simplify the expression to:

z = 4 * (r * sin(θ)) = 4r * sin(θ).

Now, differentiate z with respect to r:

dz/dr = d/dx[4r * sin(θ)].

Using the product rule, we have:

dz/dr = 4 * sin(θ) * (d/dx[r]) + r * (d/dx[sin(θ)]).

Since r is the variable with respect to which we are differentiating, its derivative is 1:

dz/dr = 4 * sin(θ) * 1 + r * (d/dx[sin(θ)]).

Now, differentiate sin(θ) with respect to x:

d/dx[sin(θ)] = cos(θ) * (d/dx[θ]).

Since θ is a parameter, its derivative is 0:

d/dx[sin(θ)] = cos(θ) * 0 = 0.

Substituting this back into the expression for dz/dr:

dz/dr = 4 * sin(θ) * 1 + r * 0 = 4 * sin(θ).

Finally, substitute θ = π/2 (corresponding to y = 4) into the expression for dz/dr:

dz/dr = 4 * sin(π/2) = 4 * 1 = 4.

Therefore, dz/dr at (2, 4) is 4.

Let w = x^2 + y^2, where x = r - s and y = r + s. We need to find dθ/dr.

To express w in terms of r and s, substitute the given expressions for x and y:

w = (r - s)^2 + (r + s)^2.

Expanding and simplifying:

w = r^2 - 2rs + s^2 + r^2 + 2rs + s^2 = 2r^2 + 2s^2.

Now, differentiate w with respect to r:

dw/dr = d/dx[2r^2 + 2s^2].

Using the chain rule, we have:

dw/dr = 2 * d/dr[r^2] + 2 * d/dr[s^2].

Differentiating r^2 with respect to r:

d/dr[r^2] = 2r.

Differentiating s^2 with respect to r:

d/dr[s^2] = 2s * (d/dr[s]).

Since s is a constant with respect to r, its derivative is 0:

d/dr[s^2] = 2s * 0 = 0.

Substituting the derivatives back into the expression for dw/dr:

dw/dr = 2 * 2r + 2 * 0 = 4r.

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To apply the Limit Comparison Test for the series[tex]Σ(2n^2 + 3)/(5 + n^5)[/tex] as n approaches infinity, we can compare it with the series[tex]Σ(1/n^3).[/tex]

First, we need to find the limit of the ratio of the two series as n approaches infinity:

[tex]lim(n- > ∞) [(2n^2 + 3)/(5 + n^5)] / (1/n^3)[/tex]

Next, we can divide the numerator and denominator by the highest power of n:

[tex]lim(n- > ∞) [2 + (3/n^2)] / (1/n^5)[/tex]

Taking the limit as n approaches infinity, the second term (3/n^2) approaches zero, and the expression simplifies to:

l[tex]im(n- > ∞) [2] / (1/n^5) = 2 * n^5[/tex]

Therefore, if the series[tex]Σ(1/n^3)[/tex] converges, then the series [tex]Σ(2n^2 + 3)/(5 + n^5)[/tex] also converges. And if the series Σ(1/n^3) diverges, then the series [tex]Σ(2n^2 + 3)/(5 + n^5)[/tex] also diverges.

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There are 3,003 different ways to form the special committee of 5 members from the academic senate consisting of 15 members.

To form a special committee of 5 members from an academic senate consisting of 15 members, the number of different ways the committee can be formed is determined by calculating the combination. The answer is found using the formula for combinations, which is explained in detail below.

To determine the number of different ways to form the committee, we use the concept of combinations. In this case, we need to select 5 members from a total of 15 members.

The formula for combinations is given by C(n, k) = n! / (k!(n-k)!), where n is the total number of members and k is the number of members to be selected for the committee. In this scenario, n = 15 and k = 5.

Plugging the values into the formula, we have C(15, 5) = 15! / (5!(15-5)!) = (15 * 14 * 13 * 12 * 11) / (5 * 4 * 3 * 2 * 1) = 3,003.

Therefore, each combination represents a unique arrangement of individuals that can be selected for the committee.

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The derivative of the given equation is dy/dx = -13/8253.

The equation of the tangent line to the curve at (1, 1) is y = (-13/8253)x + 8266/8253 in mx + b format.

To find dy/dx, we need to differentiate the given equation with respect to x:

13x + 8252y + y = 22

Differentiating both sides with respect to x:

13 + 8252(dy/dx) + (dy/dx) = 0

Simplifying the equation:

8252(dy/dx) + (dy/dx) = -13

Combining like terms:

8253(dy/dx) = -13

Dividing both sides by 8253:

dy/dx = -13/8253

Now, to find the equation of the tangent line at (1, 1), we have the slope (m) as dy/dx = -13/8253 and a point (1, 1). Using the point-slope form of a line, we can write the equation:

y - y1 = m(x - x1)

Substituting the values (1, 1) and m = -13/8253:

y - 1 = (-13/8253)(x - 1)

Simplifying the equation:

y - 1 = (-13/8253)x + 13/8253

Bringing 1 to the other side:

y = (-13/8253)x + 13/8253 + 1

Simplifying further:

y = (-13/8253)x + (8253 + 13)/8253

Final equation of the tangent line in mx + b format is:

y = (-13/8253)x + 8266/8253

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An equation to express h in terms of r is h = 1000/r².

In Mathematics and Geometry, the volume of a cylinder can be calculated by using this formula:

Volume of a cylinder, V = πr²h

Where:

Since the cylindrical portion of the silo must hold 1000π cubic feet of grain, we have the following:

1000π = πr²h

By making height (h) the subject of formula, we have the following:

1000 = r²h

h = 1000/r²

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the Trapezoidal Rule gives an approximation of 0.9500, the Midpoint Rule gives an approximation of 1.0000, and Simpson's In r Rule gives an approximation of 1.0000, all rounded to four decimal places.

To approximate the integral of da using the Trapezoidal Rule, we need to divide the interval into n subintervals of equal width and approximate the area under the curve using trapezoids. The formula for the Trapezoidal Rule is:
∫a^b f(x)dx ≈ (b-a)/2n [f(a) + 2f(a+h) + 2f(a+2h) + ... + 2f(a+(n-1)h) + f(b)]
where h = (b-a)/n is the width of each subinterval.
a) With n = 10, we have h = (1-0)/10 = 0.1. Therefore, the Trapezoidal Rule approximation is:
∫0^1 da ≈ (1-0)/(2*10) [1 + 2(1) + 2(1) + ... + 2(1) + 1] ≈ 0.9500
b) To use the Midpoint Rule, we approximate the curve by rectangles of height f(x*) and width h, where x* is the midpoint of each subinterval. The formula for the Midpoint Rule is:
∫a^b f(x)dx ≈ hn [f(x1/2) + f(x3/2) + ... + f(x(2n-1)/2)]
where xk/2 = a + kh is the midpoint of the kth subinterval.
With n = 10, we have h = 0.1 and xk/2 = 0.05 + 0.1k. Therefore, the Midpoint Rule approximation is:
∫0^1 da ≈ 0.1 [1 + 1 + ... + 1] ≈ 1.0000
c) Finally, to use Simpson's In r Rule, we approximate the curve by parabolas using three equidistant points in each subinterval. The formula for Simpson's In r Rule is:
∫a^b f(x)dx ≈ (b-a)/6n [f(a) + 4f(a+h) + 2f(a+2h) + 4f(a+3h) + ... + 2f(a+(2n-2)h) + 4f(a+(2n-1)h) + f(b)]
With n = 10, we have h = 0.1. Therefore, the Simpson's In r Rule approximation is:
∫0^1 da ≈ (1-0)/(6*10) [1 + 4(1) + 2(1) + 4(1) + ... + 2(1) + 4(1) + 1] ≈ 1.0000
Thus, the Trapezoidal Rule gives an approximation of 0.9500, the Midpoint Rule gives an approximation of 1.0000, and Simpson's In r Rule gives an approximation of 1.0000, all rounded to four decimal places.

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Approximately 2 iterations are needed to calculate the root of f(x) = x - 2 using the Bisection method with an absolute error tolerance of 10^-1.

To determine the number of iterations needed to calculate the root of f(x) = x - 2 using the Bisection method with an absolute error tolerance of 10^-1, we can use the formula:

n = (log(b - a) - log(ε)) / log(2)

where n is the number of iterations, a and b are the endpoints of the interval (1 and 2 in this case), and ε is the absolute error tolerance (10^-1 in this case).

Plugging in the values, we have:

n = (log(2 - 1) - log(10^-1)) / log(2)

Simplifying further:

n = (log(1) - log(10^-1)) / log(2)

n = (-log(10^-1)) / log(2)

n = (-(-1)) / log(2)

n = 1 / log(2)

n ≈ 1.4427

Since the number of iterations should be a whole number, we round up to the nearest integer:

n ≈ 2

Therefore, approximately 2 iterations are needed to calculate the root of f(x) = x - 2 using the Bisection method with an absolute error tolerance of 10^-1.

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Solving the equation, the solution is :

B. (x^3 + 3x^3y^4)dx + 2ydy = -dx/(1 + 3y^4).

To solve the equation:

(x^2 + 3x^3y^4)dx + 2ydy = 0,

we can begin by separating the variables.

The correct answer is:

B. (x^3 + 3x^3y^4)dx + 2ydy = -dx/(1 + 3y^4).

By rearranging the terms, we can write the equation as:

(x^3 + 3x^3y^4)dx + dx = -2ydy.

Simplifying further:

(x^3 + 3x^3y^4 + 1)dx = -2ydy.

Now, we have the equation separated into two sides, with the left side containing only x and dx terms, and the right side containing only y and dy terms.

Hence, the separated form of the equation is:

(x^3 + 3x^3y^4 + 1)dx + 2ydy = 0.

The implicit solution in the form F(x, y) = C is given by:

(x^3 + 3x^3y^4 + 1) + y^2 = C,

where C is an arbitrary constant.

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A triangle with angle A = 57.3°, side a = 10.6, and side c = 13.7, can be solved for the unknown side b using the Law of Sines.

To solve for the unknown side b, we can use the Law of Sines, which states that the ratio of the length of a side of a triangle to the sine of its opposite angle is constant for all sides and angles of the triangle.

Applying the Law of Sines, we have:

sin(A)/a = sin(B)/b

Substituting the known values, we get:

sin(57.3°)/10.6 = sin(B)/b

Solving for sin(B), we find:

sin(B) = (sin(57.3°) * b) / 10.6

To isolate b, we can rearrange the equation as:

b = (10.6 * sin(B)) / sin(57.3°)

Using a calculator, we can evaluate sin(B) by taking the inverse sine of (a/c) since sin(B) = (a/c) according to the Law of Sines. Once we have the value of sin(B), we can substitute it back into the equation to calculate the value of b.

In summary, by using the Law of Sines, we can solve for the unknown side b by substituting the known values and evaluating the equation. The value of side b can be rounded to the nearest tenth.

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the indefinite integral of (e^(2x) + 5)^4 dx is (1/8) * e^(8x) + C.

To find the indefinite integral ∫ (e^(2x) + 5)^4 dx, we can use the substitution method.

Let U = e^(2x) + 5. Taking the derivative of U with respect to x, we have:

dU/dx = d/dx (e^(2x) + 5)

      = 2e^(2x)

Now, we solve for dx in terms of dU:

dx = (1 / (2e^(2x))) dU

Substituting these values into the integral, we have:

∫ (e^(2x) + 5)^4 dx = ∫ U^4 (1 / (2e^(2x))) dU

Next, we need to express the entire integrand in terms of U only. We can rewrite e^(2x) in terms of U:

e^(2x) = U - 5

Now, substitute U - 5 for e^(2x) in the integral:

∫ (U - 5)^4 (1 / (2e^(2x))) dU

= ∫ (U - 5)^4 (1 / (2(U - 5))) dU

= (1/2) ∫ (U - 5)^3 dU

Integrating (U - 5)^3 with respect to U:

= (1/2) * (1/4) * (U - 5)^4 + C

= (1/8) * (U - 5)^4 + C

Now, substitute back U = e^(2x) + 5:

= (1/8) * (e^(2x) + 5 - 5)^4 + C

= (1/8) * (e^(2x))^4 + C

= (1/8) * e^(8x) + C

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The equation of the line through the point (1, -2) and perpendicular to the line 20 - 5y = 9 is y = 1/5x - 11/5.

Let's first rewrite the equation 23 - 5y = 9 in slope-intercept form

y = mx + b

-5y = 9 - 23

-5y = -14

y = 14/5

The given line has a slope of -5/1 or -5.

Since parallel lines have the same slope, the parallel line we're looking for will also have a slope of -5.

Using the point-slope form of a linear equation, we can now write the equation of the parallel line passing through the point (1, -2):

y - y1 = m(x - x1)

y - (-2) = -5(x - 1)

y + 2 = -5x + 5

y = -5x + 3

Therefore, the equation of the line through the point (1, -2) and parallel to the line 23 - 5y = 9 is y = -5x + 3.

(b) First, rewrite the equation 20 - 5y = 9 in slope-intercept form:

-5y = 9 - 20

-5y = -11

y = 11/5

The given line has a slope of -5/1 or -5.

Perpendicular lines have slopes that are negative reciprocals of each other, so the perpendicular line we're looking for will have a slope of 1/5.

Using the point-slope form and the point (1, -2):

y - y1 = m(x - x1)

Plugging in the values: x1 = 1, y1 = -2, and m = 1/5, we have:

y - (-2) = 1/5(x - 1)

y + 2 = 1/5x - 1/5

y = 1/5x - 11/5

Therefore, the equation of the line through the point (1, -2) and perpendicular to the line 20 - 5y = 9 is y = 1/5x - 11/5.

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10 represents the hypothesized average arrival time.

The null and alternative hypotheses for the researcher's inquiry can be stated as follows:

Null Hypothesis (H0): The average arrival time of packages from Hong Kong to Australia is equal to 10 days.Alternative Hypothesis (HA): The average arrival time of packages from Hong Kong to Australia is not equal to 10 days.

In symbolic notation:

H0: μ = 10

HA: μ ≠ 10

Where:H0 represents the null hypothesis ,

HA represents the alternative hypothesis,μ represents the population mean arrival time, and

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In a connected graph with at least two nodes, there always exists a node that, when removed along with its incident edges, leaves the graph still connected.

Let's assume we have a connected graph G with at least two nodes. If G is a tree, then any node can be removed, and the resulting graph will still be connected since a tree is a connected graph with no cycles.

Now, let's consider the case where G is not a tree. In this case, G must contain at least one cycle. If we remove any node on the cycle, the remaining graph will still be connected because there will be alternative paths to connect the remaining nodes.

If G does not contain a cycle, it must be a tree. In this case, removing any leaf node (a node with only one incident edge) will result in a connected graph since the remaining nodes will still be connected through the remaining edges.

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To calculate the flux of the vector field[tex](z^3, y^2)[/tex] out of the annular region between the equations[tex]r^2 + y^2 = 4[/tex]and[tex]x^2 + y^2 = 25[/tex], we need to apply the flux integral formula.

The annular region can be described as a region between two circles, where the inner circle has a radius of 2 and the outer circle has a radius of 5. By setting up the flux integral with appropriate limits of integration and using the divergence theorem, we can evaluate the flux of the vector field over the annular region. However, since the specific limits of integration or the desired orientation of the region are not provided, a complete calculation cannot be performed.

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The equation simplifies to 1 = 1, which is true. The given equation is: xy - y + x = 1

To find the positive y-value that satisfies the equation xy - y + x = 1 when x = 1, we need to substitute x = 1 into the equation and solve for y.

Replacing x with 1 in the equation, we have:

1*y - y + 1 = 1

Simplifying the equation, we get:

y - y + 1 = 1

0 + 1 = 1

So, the equation simplifies to 1 = 1, which is true. However, this equation does not provide any specific value for y.

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To evaluate the integral ∫∫∫E JUz yz dV over the solid E in the first octant bounded by the paraboloid z = 4 - [tex]x^{2}[/tex] - [tex]y^{2}[/tex], we can use cylindrical coordinates.

In cylindrical coordinates, we can express the paraboloid as z = 4 - [tex]r^{2}[/tex], where r is the radial distance from the z-axis and ranges from 0 to √(4 - [tex]y^{2}[/tex]). The integral becomes ∫∫∫E JUz yz dV = ∫∫∫E JUz r(4 - [tex]r^{2}[/tex]) r dz dr dy.

To evaluate this triple integral, we first integrate with respect to z. Since the region E lies under the paraboloid, the limits of integration for z are 0 to 4 - [tex]r^{2}[/tex]

Next, we integrate with respect to r. The limits of integration for r depend on the value of y. When y is 0, the paraboloid intersects the z-axis, so the lower limit for r is 0. When y is √(4 - [tex]y^{2}[/tex]), the paraboloid intersects the xy-plane, so the upper limit for r is √(4 - [tex]y^{2}[/tex]).

Finally, we integrate with respect to y. The limits of integration for y are 0 to 2, as we are considering the first octant.

By evaluating the triple integral over the given limits, we can determine the value of ∫∫∫E JUz yz dV.

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The center of the sphere is (-5, 3/2, -31), and its radius is [tex]\sqrt{(5675/4).[/tex]

To write the equation of the sphere in standard form, we need to complete the square for the terms involving x, y, and z.

Given the equation [tex]x^2 + y^2 + z^2 + 10x - 3y + 62z + 46 = 0[/tex], we can rewrite it as follows:

[tex](x^2 + 10x) + (y^2 - 3y) + (z^2 + 62z) = -46[/tex]

To complete the square for x, we add [tex](10/2)^2 = 25[/tex] to both sides:

[tex](x^2 + 10x + 25) + (y^2 - 3y) + (z^2 + 62z) = -46 + 25\\(x + 5)^2 + (y^2 - 3y) + (z^2 + 62z) = -21[/tex]

To complete the square for y, we add [tex](-3/2)^2 = 9/4[/tex] to both sides:

[tex](x + 5)^2 + (y^2 - 3y + 9/4) + (z^2 + 62z) = -21 + 9/4\\(x + 5)^2 + (y - 3/2)^2 + (z^2 + 62z) = -84/4 + 9/4\\(x + 5)^2 + (y - 3/2)^2 + (z^2 + 62z) = -75/4[/tex]

To complete the square for z, we add [tex](62/2)^2 = 961[/tex] to both sides:

[tex](x + 5)^2 + (y - 3/2)^2 + (z^2 + 62z + 961) = -75/4 + 961\\(x + 5)^2 + (y - 3/2)^2 + (z + 31)^2 = 3664/4 + 961\\(x + 5)^2 + (y - 3/2)^2 + (z + 31)^2 = 5675/4[/tex]

Now we have the equation of the sphere in standard form:

[tex](x + 5)^2 + (y - 3/2)^2 + (z + 31)^2 = 5675/4.[/tex]

The center of the sphere is given by the values inside the parentheses: (-5, 3/2, -31).

To find the radius, we take the square root of the right-hand side: sqrt(5675/4).

Therefore, the center of the sphere is (-5, 3/2, -31), and its radius is the square root of 5675/4.

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To find the solution u from the given differential equation du/dt = 2.5t - 3.6u with the initial condition u(0) = 1.4, we can use the method of separation of variables. After integrating the equation, we can solve for u to find the solution.

Let's start by separating the variables in the differential equation:

du/(2.5t - 3.6u) = dt

Next, we integrate both sides with respect to their respective variables:

∫(1/(2.5t - 3.6u)) du = ∫dt

To integrate the left side, we need to use a substitution. Let's substitute v = 2.5t - 3.6u. Then, dv = -3.6 du, which gives du = -dv/3.6. Substituting these values, we have:

∫(1/v) (-dv/3.6) = ∫dt

Applying the integral, we get:

(1/3.6) ln|v| = t + C

Simplifying further:

ln|v| = 3.6t + C

Now, we substitute v back using v = 2.5t - 3.6u:

ln|2.5t - 3.6u| = 3.6t + C

Finally, we apply the initial condition u(0) = 1.4. Substituting t = 0 and u = 1.4 into the equation, we can solve for the constant C. Once we have C, we can rearrange the equation to solve for u.

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Triangles DEF and GIH are congruent by the Angle-Side-Angle (ASA) congrunce theorem.

The Angle-Side-Angle (ASA) congruence theorem states that if any of the two angles on a triangle are the same, along with the side between them, then the two triangles are congruent.

For this problem, we have that for both triangles, the side lengths between the two angles measures is congruent, hence the ASA congruence theorem holds true for the triangle.

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120 cubes with side lengths of 1/4 inch would be needed to fill the given right rectangular prism.

To determine the number of cubes with side lengths of 1/4 inch that can fit in the given right rectangular prism, we need to calculate the volume of the prism and divide it by the volume of one cube.

The formula for the volume of a right rectangular prism is V = l x w x h, where l is the length, w is the width, and h is the height. Plugging in the given measurements, we get:

V = (5/4) x 1 x (3/2) = 15/8 cubic inches

The volume of one cube with side length of 1/4 inch is (1/4)^3 = 1/64 cubic inches.

Therefore, the number of cubes needed to fill the prism would be:

(15/8) ÷ (1/64) = 120

We use the formula for the volume of a right rectangular prism to find the total volume of the prism. Then, we use the formula for the volume of a cube to calculate the volume of one cube. Finally, we divide the volume of the prism by the volume of one cube to determine the number of cubes needed to fill the prism.

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The graph of the inverse of the function f graphed above is represented by the graph (B).Graph (B) is the reflection of graph (A) in the line y = x.

The term "inverse" in mathematics describes an action that "undoes" another action. It is the antithesis or reversal of a specific function or process. A function's inverse is represented by the notation f(-1)(x) or just f(-1). Inverses can be used in addition, subtraction, multiplication, division, and the composition of functions, among other mathematical operations.

Applying the function followed by its inverse yields the original input value since the inverse function reverses the effects of the original function. In other words, if y = f(x), then x = f(-1)(y) is obtained by using the inverse function.

The given graph is as shown below: Since the inverse function reverses the input and output of the original function, the graph of the inverse function is the reflection of the graph of the original function about the line y = x.

Therefore, the graph of the inverse of the function f graphed above is represented by the graph (B).Graph (B) is the reflection of graph (A) in the line y = x.

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Therefore, the probability that a customer who did not fill their tank requested regular gas is approximately 0.5714.

Let's denote the event of a customer requesting regular gas as R, and the event of a customer not filling their tank as N.

We are given the following probabilities:

P(R) = 0.40 (Probability of requesting regular gas)

P(M) = 0.35 (Probability of requesting mid-grade gas)

P(P) = 0.25 (Probability of requesting premium gas)

We are also given the conditional probabilities:

P(N|R) = 0.70 (Probability of not filling tank given requesting regular gas)

P(N|M) = 0.40 (Probability of not filling tank given requesting mid-grade gas)

P(N|P) = 0.50 (Probability of not filling tank given requesting premium gas)

We need to find the probability that the customers who did not fill their tanks requested regular gas, P(R|N).

Using Bayes' theorem, we can calculate this probability:

P(R|N) = (P(N|R) * P(R)) / P(N)

To calculate P(N), we need to consider the probabilities of not filling the tank for each gas type:

P(N) = P(N|R) * P(R) + P(N|M) * P(M) + P(N|P) * P(P)

Substituting the given values, we can calculate P(N):

P(N) = (0.70 * 0.40) + (0.40 * 0.35) + (0.50 * 0.25) = 0.49

Now we can substitute the values into Bayes' theorem to find P(R|N):

P(R|N) = (0.70 * 0.40) / 0.49 ≈ 0.5714

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To calculate the area of the triangle formed by the vectors a = (3, 2, -2) and b = (2, -1, 2), we can use the cross product of these vectors.

The cross product of two vectors in three-dimensional space gives a new vector that is orthogonal to both of the original vectors. The magnitude of this cross product vector represents the area of the parallelogram formed by the two original vectors, and since we want the area of the triangle, we can divide it by 2.

First, we calculate the cross product of vectors a and b:

a x b = [(2 * -2) - (-1 * 2), (3 * 2) - (2 * -2), (3 * -1) - (2 * 2)]

= [-2 + 2, 6 + 4, -3 - 4]

= [0, 10, -7]

The magnitude of the cross product vector is given by:

|a x b| = sqrt(0² + 10² + (-7)²)

[tex]= \sqrt{(0 + 100 + 49)}\\ \\= \sqrt{(149)[/tex]

Finally, the area of the triangle formed by the vectors a and b is

[tex]|a * b| / 2 = \sqrt{149} / 2 = 6.1[/tex] : (rounded to 1 decimal place).

Therefore, the area of the triangle is approximately 6.1 square units.

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Here, [tex]det(5B^T) = -2 * (5^n)[/tex] and d[tex]et(SB^T) = (S^n) * (-2)[/tex], where n is the dimension of B and S is the scaling factor of the scalar matrices S.

The determinant of the product of the scalar and matrices transpose is equal to the scalar multiplication of the matrix dimensions and the determinant of the original matrix. So [tex]det(5B^T)[/tex]can be calculated as [tex](5^n) * det(B)[/tex]. where n is the dimension of B. In this case B is an n × n matrix, so [tex]det(5B^ T) = (5^n) * det(B) = (5^n) * (-2) = -2 * (5^ n )[/tex].

Similarly, [tex]det(SB^T)[/tex] can be calculated as [tex](det(S))^n * det(B)[/tex]. A scalar matrix S scales only the rows of B so its determinant det(S) is equal to the higher scale factor of B 's dimension. Therefore,[tex]det(SB^T) = (det(S))^n * det(B) = (S^n) * (-2)[/tex]. where[tex]S^n[/tex] represents the n-th power scaling factor. 

The determinant of a matrix is ​​a scalar value derived from the elements of the matrix. It is a fundamental concept in linear algebra and has many applications in mathematics and science.

To compute the determinant of a square matrix, the matrix must have the same number of rows and columns. The determinant is usually represented as "det(A)" or "|"A"|". For matrix A 

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Answer:

Step-by-step explanation:

To find the number of mowers sold 2 years after the model is introduced, we can substitute t = 2 into the given function and evaluate it.

Given the function: y = 5500 ln(9t + 4)

Substituting t = 2:

y = 5500 ln(9(2) + 4)

y = 5500 ln(18 + 4)

y = 5500 ln(22)

Using a calculator or math software, we can calculate the natural logarithm of 22 and multiply it by 5500:

y ≈ 5500 * ln(22)

y ≈ 5500 * 3.091

y ≈ 17000.5

Rounded to the nearest hundred, the number of mowers sold 2 years after the model is introduced is approximately 17,000 mowers.

Therefore, the correct answer is B. 17,000 mowers.