6. o 1 points Use logarithmic differentiation or an alternative method to find the derivative of the function y=x8 cos x Submit Answer Save Progress 6. o 1 points Use logarithmic differentia...
Use logarithmic differentiation to find the derivative of the function. Your answer should be in terms of x only, not y. y=(cos(x))^x Use logarithmic differentiation to find the derivative of the function. Your answer should be in terms of x only, not y. y = (cos(x))*
Use logarithmic differentiation to find the derivative of the function. y = (tan(x))2/ 4 cos ec(2x) y' = 2 ln(tan(x)) 2 Need Help? Read It Watch It Talk to a Tutor Submit Answer 13. [1/1 Pointsi TOT
Use logarithmic differentiation to find the derivative of the function. y = 6 Select one: a. y' = 6x®(6 Inx+1) b.y' = -6x®*(Inx+6) о C. y' = 6(Inx+1) d. None of these e. y' = 6x®* (In x + 1) f. y' = x* (In 6x + 1) o
Use logarithmic differentiation to find the derivative y = x6 cos(x) Cham, M, Aarl
[x²+1 6. Use logarithmic differentiation to find the derivative: y = 1x2-1
4. Use logarithmic differentiation to compute the derivative of y=(x + 1)*. Your answer should give as an erplicit function of x only.
34 & 38 please 33-42 Use logarithmic differentiation to find the derivative of the function. 33. y = (2x + 1)*(x4 – 3) 35. y = sin’x tanºx (x² + 1) 36. y = 34. y = (x e*'(x² + 1) 10 x2 + 1 r2 - 1 38. y = rcos 40. y= Vit 42. y = (sin x) In x 37. y = x 39. y = (cos x)* 41. y = (tan x) /
Use logarithmic differentiation to find the derivative of y with respect to the given independent variable. t 3 y= 19t + 1 =
a) b) 54-1+1 Use logarithmic differentiation to find the first derivative of y= (3x² +2) 13 Evaluate the integration I, where I = dt 5t2 3 If f'(x) == Vx+ and the curve f(x) passes through the point (0,2) 2 2 i) Find f(x) 11) Find the local extreme (if any) of f(x) using second derivative test. d) Evaluate using integration by parts: 5 (0)do, where f(O)=(0+1) sin 30 Page 4 of 5
need steps 14. Use logarithmic differentiation to find the derivative of f(x) = n(x) at = e.