I need to find dy/dx if y = pi^x(ln(sqrt(tanx)) I get y' = pi^xln(pi)(ln(sqrt(tanx))+pi^xsec^2x/2tanx However, I...

I need to find dy/dx if y = (e^(x^2))(x+1)^x my solution is y' = 2x(e^(x^2))(x+1)^x+(e^(x^2))(x+1)^x(ln(x+1)+x/(x+1)) is...

I need to find dy/dx if y = (e^(x^2))(x+1)^x my solution is y' = 2x(e^(x^2))(x+1)^x+(e^(x^2))(x+1)^x(ln(x+1)+x/(x+1)) is that correct. I am using logarithmic differentiation

a) find dy/dx for each of the following i. y = 4ex (1 + ln x)...

a) find dy/dx for each of the following i. y = 4ex (1 + ln x) [9 marks] ii. y = ex ln (5x 3 + x 2 )

if not exact make it exact then Solve (ln sin y -3x^2) dy/dx + x cot...

if not exact make it exact then Solve (ln sin y -3x^2) dy/dx + x cot y + 4y =0 y = (Pi/2)=2

solve dy/dx + y/x = 8e-2x

solve dy/dx + y/x = 8e-2x

1.Solve the following initial value problem a) dy/dx= y2/(x-3), with y(4)=2 b) (sqrt(x)) dy/dx = ey+sqrt(x),...

1.Solve the following initial value problem a) dy/dx= y2/(x-3), with y(4)=2 b) (sqrt(x)) dy/dx = ey+sqrt(x), with y(0)= 0 2. Find an expression for nth term of the sequence a) {-1, 13/24, -20/120, 27/720, ...} b) {4/10, 12/7, 36/4, 108, ...}

Use logarithmic differentiation to find dy/dx for y = x(sqrt{x^2+1})

Use logarithmic differentiation to find dy/dx for y = x(sqrt{x^2+1})

Solve: (2x^2 - y) dx + (x + y^2) dy = 0

Solve: (2x^2 - y) dx + (x + y^2) dy = 0

dy/dx = 2 sqrt(y/x) + y/x (x<0) Find general solution of the given ODE

dy/dx = 2 sqrt(y/x) + y/x (x<0) Find general solution of the given ODE

Solve the given initial-value problem. (x + 2) dy dx + y = ln(x), y(1) =...

Solve the given initial-value problem. (x + 2) dy dx + y = ln(x), y(1) = 10 y(x) = Give the largest interval I over which the solution is defined. (Enter your answer using interval notation.) I =

Consider the following differential equation: dy/dx = −(3xy+y^2)/x^2+xy (a) Rewrite this equation into the form M(x,...

Consider the following differential equation: dy/dx = −(3xy+y^2)/x^2+xy (a) Rewrite this equation into the form M(x, y)dx + N(x, y)dy = 0. Determine if this equation is exact; (b) Multiply x on both sides of the equation, is the new equation exact? (c) Solve the equation based on Part (a) and Part (b).