![SOLVED: In Problems 1 through 20, find a particular solution yp of the given equation. In all these problems, primes denote deriva- tives with respect to x. 1. y"+ 16y =e3x 2. SOLVED: In Problems 1 through 20, find a particular solution yp of the given equation. In all these problems, primes denote deriva- tives with respect to x. 1. y"+ 16y =e3x 2.](https://cdn.numerade.com/ask_images/72ab7745271345aa97d61fc20e5281ea.jpg)
SOLVED: In Problems 1 through 20, find a particular solution yp of the given equation. In all these problems, primes denote deriva- tives with respect to x. 1. y"+ 16y =e3x 2.
![SOLVED: 18. 0/1 points Previous Answers SCalcET8 3.6.048. Use logarithmic differentiation to find the derivative of the function: Y = (sin( 3x))In(x) In(sin ( 3x) (3cot 3x )Inx Need Help? Repd lu SOLVED: 18. 0/1 points Previous Answers SCalcET8 3.6.048. Use logarithmic differentiation to find the derivative of the function: Y = (sin( 3x))In(x) In(sin ( 3x) (3cot 3x )Inx Need Help? Repd lu](https://cdn.numerade.com/ask_previews/c9f5a823-d14c-4397-af63-805726c7ad2c_large.jpg)
SOLVED: 18. 0/1 points Previous Answers SCalcET8 3.6.048. Use logarithmic differentiation to find the derivative of the function: Y = (sin( 3x))In(x) In(sin ( 3x) (3cot 3x )Inx Need Help? Repd lu
![f (x) = (4^x-1) ^3/sin (x/p) log ( 1 + x^2/3 ) is continous at x = 0 and f(0) = 12 (log4) ^3 then p = . f (x) = (4^x-1) ^3/sin (x/p) log ( 1 + x^2/3 ) is continous at x = 0 and f(0) = 12 (log4) ^3 then p = .](https://haygot.s3.amazonaws.com/questions/1947532_1533145_ans_23f47dca03e64867beb522240ef44229.jpg)
f (x) = (4^x-1) ^3/sin (x/p) log ( 1 + x^2/3 ) is continous at x = 0 and f(0) = 12 (log4) ^3 then p = .
![SOLVED: Find the solution of the following Differential Equations 1) ydx + xdy = 0 3) (2x+ e" Jdx + xe" dy = 0 5) sinh(x) cos(y)dx = cosh(x) sin(y)dy 7) (I+x? ) SOLVED: Find the solution of the following Differential Equations 1) ydx + xdy = 0 3) (2x+ e" Jdx + xe" dy = 0 5) sinh(x) cos(y)dx = cosh(x) sin(y)dy 7) (I+x? )](https://cdn.numerade.com/ask_images/39c0120018eb4e2dbafe27571f100167.jpg)