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

(61). (Bernoulli’s Equation): Find the general solution of the following first-order differential equations:(a) x(dy/dx)+y= y^2+ln(x) (b)...

(61). (Bernoulli’s Equation): Find the general solution of the following first-order differential equations:(a) x(dy/dx)+y= y^2+ln(x) (b) (1/y^2)(dy/dx)+(1/xy)=1

Find dy/dx if y= (x^3+5x)(4x^2+10)^9

Find dy/dx if y= (x^3+5x)(4x^2+10)^9

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 =

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

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 = pi^x(ln(sqrt(tanx)) I get y' = pi^xln(pi)(ln(sqrt(tanx))+pi^xsec^2x/2tanx However, I still have a 1/y on the left hand side and I'm not sure if you multiply both sides by y to solve for y'.

a. *If y=x3+7/x^2/3 , then find dy/dx . Make sure your answer is fully simplified. b....

a. *If y=x3+7/x^2/3 , then find dy/dx . Make sure your answer is fully simplified. b. *If y=5x-84x+3   , then find dy/dx . c. *If x=(x2-5x+3)(2x2+4) , then find f ‘(x). Please neatly show your work.                   

find dy/dx a. (x+y)^4 =4y-9x b. y= (x +6)^2x c. y= cos^-1 (3x^2 -5x +1 )

find dy/dx a. (x+y)^4 =4y-9x b. y= (x +6)^2x c. y= cos^-1 (3x^2 -5x +1 )

1. Solve for y if dy/dx = (1/a)int[ sqr( 1+ (dt/dx)^2)]dx from 0 to x. 2....

1. Solve for y if dy/dx = (1/a)int[ sqr( 1+ (dt/dx)^2)]dx from 0 to x. 2. int[(x^2)( sqr(12-5x^2)]dx =? 3. int[(x^2)sqr(1-x)]dx =? Do this three different ways.

y = (6 +cos(x))^x Use Logarithmic Differentiation to find dy/dx dy/dx = Type sin(x) for sin(x)sin(x)...

y = (6 +cos(x))^x Use Logarithmic Differentiation to find dy/dx dy/dx = Type sin(x) for sin(x)sin(x) , cos(x) for cos(x)cos(x), and so on. Use x^2 to square x, x^3 to cube x, and so on. Use ( sin(x) )^2 to square sin(x). Use ln( ) for the natural logarithm.

Find dy/dx by implicit differentiation: A.). x^4 + y^3 = 3 B.). 5x^2 +3xy - y^2...

Find dy/dx by implicit differentiation: A.). x^4 + y^3 = 3 B.). 5x^2 +3xy - y^2 =7 C.) x^3(x+y) = y^2(4x-y)