If ​f(x)equalsStartFraction x squared minus 7 Over x plus 2 EndFraction ​, where is f not​...

Match the following equation with its graph. left parenthesis x minus 4 right parenthesis squared plus...

Match the following equation with its graph. left parenthesis x minus 4 right parenthesis squared plus left parenthesis y minus 3 right parenthesis squared equals 36(x−4)2+(y−3)2=36 Choose the correct graph below. A. -157-715xy A coordinate system has a horizontal x-axis labeled from negative 15 to 7 in increments of 1 and a vertical y-axis labeled from negative 7 to 15 in increments of 1. A circle has center (negative 4, 3) and radius 6. B. -157-157xy A coordinate system has...

The function ​f(x,y)equals=8 x squared plus y squared has an absolute maximum value and absolute minimum...

The function ​f(x,y)equals=8 x squared plus y squared has an absolute maximum value and absolute minimum value subject to the constraint x squared plus 7 y plus y squared=44. Use Lagrange multipliers to find these values.

For the equation ?f(x)equals=x squared minus 2 x minus 15x2?2x?15?, ?a) determine whether the graph of...

For the equation ?f(x)equals=x squared minus 2 x minus 15x2?2x?15?, ?a) determine whether the graph of the given quadratic function opens up or? down, ?b) find the? vertex, ?c) find the axis of? symmetry, ?d) find the? x- and? y-intercepts, and ?e) sketch the graph of the function.

The function ​f(x,y)equals2 x squared plus y squared has an absolute maximum value and absolute minimum...

The function ​f(x,y)equals2 x squared plus y squared has an absolute maximum value and absolute minimum value subject to the constraint x squared plus 4 y plus y squaredequals32. Use Lagrange multipliers to find these values.

Given the cost​ function: Cost equals 0.2 q cubed minus 6 q squared plus 80 q...

Given the cost​ function: Cost equals 0.2 q cubed minus 6 q squared plus 80 q plus Upper F ​, and marginal​ cost: 0.6q2 minus 12q​ + 80 where q​ = output, and F​ = fixed costs​ = ​$100 . The demand equation​ is: p​ = 100 minus 2 q. Determine the​ profit-maximizing price and output for a monopolist. The​ profit-maximizing output level occurs at nothing units of output ​(round your answer to the nearest tenth​). The​ profit-maximizing price occurs...

Solve the polynomial inequality. Express the solution using interval notation. x cubed plus 6 x squared...

Solve the polynomial inequality. Express the solution using interval notation. x cubed plus 6 x squared minus 36 x less than or equals 216x3+6x2−36x ≤ 216 The inequality x cubed plus 6 x squared minus 36 x less than or equals 216x3+6x2−36x ≤ 216 is true on the​ interval(s) nothing.

If f is a differentiable function such that f′(x) = (x^2− 16)*g(x), where g(x)>0 for all...

If f is a differentiable function such that f′(x) = (x^2− 16)*g(x), where g(x)>0 for all x, at which value(s) of x does f have a local maximum? 1. At both x=-4,4 2. Only at x=-16 3. Only at x=4 4. At both x=-16,16 5. Only at x=-4 6. Only at x=16

Construct a 99% confidence interval for mu 1 minus mu 2μ1−μ2 with the sample statistics for...

Construct a 99% confidence interval for mu 1 minus mu 2μ1−μ2 with the sample statistics for mean cholesterol content of a hamburger from two fast food chains and confidence interval construction formula below. Assume the populations are approximately normal with unequal variances. Stats x overbar 1 equals 134 mg comma s 1 equals 3.64 mg comma n 1 equals 20x1=134 mg, s1=3.64 mg, n1=20 x overbar 2 equals 88 mg comma s 2 equals 2.02 mg comma n 2 equals...

1.Find ff if f′′(x)=2+cos(x),f(0)=−7,f(π/2)=7.f″(x)=2+cos⁡(x),f(0)=−7,f(π/2)=7. f(x)= 2.Find f if f′(x)=2cos(x)+sec2(x),−π/2<x<π/2,f′(x)=2cos⁡(x)+sec2⁡(x),−π/2<x<π/2, and f(π/3)=2.f(π/3)=2. f(x)= 3. Find ff if...

1.Find ff if f′′(x)=2+cos(x),f(0)=−7,f(π/2)=7.f″(x)=2+cos⁡(x),f(0)=−7,f(π/2)=7. f(x)= 2.Find f if f′(x)=2cos(x)+sec2(x),−π/2<x<π/2,f′(x)=2cos⁡(x)+sec2⁡(x),−π/2<x<π/2, and f(π/3)=2.f(π/3)=2. f(x)= 3. Find ff if f′′(t)=2et+3sin(t),f(0)=−8,f(π)=−9. f(t)= 4. Find the most general antiderivative of f(x)=6ex+9sec2(x),f(x)=6ex+9sec2⁡(x), where −π2<x<π2. f(x)= 5. Find the antiderivative FF of f(x)=4−3(1+x2)−1f(x)=4−3(1+x2)−1 that satisfies F(1)=8. f(x)= 6. Find ff if f′(x)=4/sqrt(1−x2)  and f(1/2)=−9.

1) Find the net change in f(x) on 0≤x≤3 where: f'(x)=(x^3)/√(36−x^2) Express your answer in exact...

1) Find the net change in f(x) on 0≤x≤3 where: f'(x)=(x^3)/√(36−x^2) Express your answer in exact form. 2) Evaluate the definite integral from 3 to √18: ∫(√9√(x(squared)−9)/x dx 3) Compute the given integral. ∫√(x(squared)-9)