Find P that satisfies the equation. xP'' + (1/2 - x)P' + 2P = 0

A population P obeys the logistic model. It satisfies the equation dP/dt=(2/700)*P(7−P) for P>0 Assume that...

A population P obeys the logistic model. It satisfies the equation dP/dt=(2/700)*P(7−P) for P>0 Assume that P(0)=2. Find P(53)

Use the probability distribution to find the following. x P(x) xP(x) (x - μ)2*P(x) 8 0.045...

Use the probability distribution to find the following. x P(x) xP(x) (x - μ)2*P(x) 8 0.045 9 0.178 10 0.226 11 0.402 12 0.149 Find P(x > 10) Create an appropriate column on the table to find the mean. Create an appropriate column on the table to find the standard deviation.

A Bernoulli differential equation is one of the form dxdy+P(x)y=Q(x)yn Observe that, if n=0 or 1,...

A Bernoulli differential equation is one of the form dxdy+P(x)y=Q(x)yn Observe that, if n=0 or 1, the Bernoulli equation is linear. For other values of n, the substitution u=y^(1−n) transforms the Bernoulli equation into the linear equation du/dx+(1−n)P(x)u=(1−n)Q(x) Use an appropriate substitution to solve the equation y'−(3/x)y=y^4/x^2 and find the solution that satisfies y(1)=1

Find the particular antiderivative that satisfies the following conditions: A) p'(x)=-20/X^2 ; p(4)=3 B) p'(x)=2x^2-7x ;...

Find the particular antiderivative that satisfies the following conditions: A) p'(x)=-20/X^2 ; p(4)=3 B) p'(x)=2x^2-7x ; p(0)=3,000 C) Consider the function f(x)=3cos⁡x−7sin⁡x. Let F(x) be the antiderivative of f(x) with F(0)=7 D) A particle is moving as given by the data: v(t)=4sin(t)-7cos(t) ; s(0)=0

Assume that the price and the demand are both positive. Use the price-demand equation, x= f(p)=  √(1600-2p^2)...

Assume that the price and the demand are both positive. Use the price-demand equation, x= f(p)=  √(1600-2p^2) to find the values of p for which demand is elastic and the values for which demand is inelastic.

The deflection of a beam, y(x), satisfies the differential equation 8 * d 4y dx4   =  w(x)    on  0  ...

The deflection of a beam, y(x), satisfies the differential equation 8 * d 4y dx4   =  w(x)    on  0  <  x  <  1. Find y(x) in the case where w(x) is equal to the constant value 38, and the beam is embedded on the left (at x  =  0) and simply supported on the right (at x  =  1). Please Calculate all the constant in equation

Suppose T: P2(R) ---> P2(R) by T(p(x)) = x^2 p''(x) + xp'(x) and U : P2(R)...

Suppose T: P2(R) ---> P2(R) by T(p(x)) = x^2 p''(x) + xp'(x) and U : P2(R) --> R by U(p(x)) = p(0) + p'(0) + p''(0). a. Calculate U composed of T(p(x)) without using matricies. b. Assuming the standard bases for P2(R) and R find matrix representations of T, U, and U composed of T. c. Show through matrix multiplication that the matrix representation of U composed of T equals the product of the matrix representations of U and T.

The supply equation for a certain tee shirt is x = 3p2 + 2p where p...

The supply equation for a certain tee shirt is x = 3p2 + 2p where p dollars is the discount price per tee shirt when 1000x tee shirts are supplied. 1) Find the average rate of change of the supply per $1 change in the discount price when the price is increased from $10 to $11. 2) Find the instantaneous rate of change of the supply per $1 change in the discount price when the price is $10.

Find the particular solution of the differential equation that satisfies the initial condition(s). f "(x)=2, f...

Find the particular solution of the differential equation that satisfies the initial condition(s). f "(x)=2, f '(2) = 5, f(2)=10

Find an equation for the ellipse that has its center at the origin and satisfies the...

Find an equation for the ellipse that has its center at the origin and satisfies the given conditions. Vertices V(±6, 0),    foci F(±2, 0) Find an equation for the ellipse that has its center at the origin and satisfies the given conditions. eccentricity 3 5 ,    vertices V(0, ±5)