Minimize Q=2x^2+7y^2, where x+y=9

Maximize Q=xy, where x and y are positive numbers such that x + 4/3y^2 = 9....

Maximize Q=xy, where x and y are positive numbers such that x + 4/3y^2 = 9. The maximum value of Q is ___ and occurs at x= ___ and y= ___. (Type exact answers in simplified form.)

Use the technique developed in this section to solve the minimization problem. Minimize   C = x...

Use the technique developed in this section to solve the minimization problem. Minimize   C = x − 7y + z subject to   x − 2y + 3z ≤ 10 2x + y − 2z ≤ 15 2x + y + 3z ≤ 20 x ≥ 0, y ≥ 0, z ≥ 0   The minimum is C =   at (x, y, z) =

Find the total differential. w = (2x + y) / (3z - 7y)

Find the total differential. w = (2x + y) / (3z - 7y)

Use the method of this section to solve the linear programming problem. Minimize   C = x...

Use the method of this section to solve the linear programming problem. Minimize   C = x + 2y subject to   4x + 7y ≤ 60 2x + y = 28 x ≥ 0, y ≥ 0    The minimum is C =   at (x, y) =

1.) P(2, 4) lies on the graph of y=x4-2x-4 Q is the point (x, x4-2x-4) Write...

1.) P(2, 4) lies on the graph of y=x4-2x-4 Q is the point (x, x4-2x-4) Write an equation for the slope of the secant line through P and Q as a function of x. 2.) Using the formula above, find the slopes fo 1.9, 1.99, 1.999, 2.001, 2.01, and 2.1 (round 4 decimal places) 3.) What is the slope of the tangent line to the curve y=x4-2x-4 at P(2, 4) Can you please explain in detail how to get the...

The temperature on the surface of the sphere x^2+y^2+z^2=9 is given by T(x,y,z)=2x+2y+z, What is the...

The temperature on the surface of the sphere x^2+y^2+z^2=9 is given by T(x,y,z)=2x+2y+z, What is the temperature at the hottest point on the sphere? Enter your answer as a decimal.

For X and Y with the initial joint density of f(x,y)= (3/2)(2−2x−y), 0<x<1and0<y<2−2x, findP(Y <1|X=1/2).

For X and Y with the initial joint density of f(x,y)= (3/2)(2−2x−y), 0<x<1and0<y<2−2x, findP(Y <1|X=1/2).

2. Let Q1 = y(2), Q2 = y(3), where y = y(x) solves y' + 2xy...

2. Let Q1 = y(2), Q2 = y(3), where y = y(x) solves y' + 2xy = 2x^3 , y(0) = 1. Let Q = ln(3 + |Q1| + 2|Q2|). Then T = 5 sin^2 (100Q) satisfies:— (A) 0 ≤ T < 1. — (B) 1 ≤ T < 2. — (C) 2 ≤ T < 3. — (D) 3 ≤ T < 4. — (E) 4 ≤ T ≤ 5.

what is the area between the curves y=x^3+x^2-1 and y=2x^2+2x-1

what is the area between the curves y=x^3+x^2-1 and y=2x^2+2x-1

Evaluate∫ C F ⋅ d r , where F(x,y,z)={e^−4x,e^2x,1e^z} and C is the boundary of the...

Evaluate∫ C F ⋅ d r , where F(x,y,z)={e^−4x,e^2x,1e^z} and C is the boundary of the part of the plane 3x+7y+5z=3 lying in the first octant, traversed counterclockwise as viewed from above. HINT: Use Stokes' Theorem.