Let y = xx + cos(x). Find y′.A. y′ = xxx−1 − sin(x)B. y′ = xx(ln(x) + 1)C. y′ = y(ln(x) + 1)D. y′ = xx(ln(x) + 1) − sin(x)E. y′ = y(ln(x) + 1) + sin(x)

xercise6. Dierentiate the given function(a) f (x) = ln(cos x)(b) f (x) = cos (ln x)(c) f (x) = log3(x2 − 4)(d) g (x) = ln a − xa + x(e) g (x) = √x ln x(f) h(x) = ln(e−x + xe−x )7. If f (x) = xln x , nd f ′(e).8. Use Logarithmic Dierentiation to nd the derivative of the function(a) y = (3x − 7)4(8x2 − 1)3(b) y = xx(c) y = xsin x(d) y =√ x2 + 1x + 1

Q 60. Find dy/dx, given y = (2tanx * sin2x) / (sec'x - 1) ? Ops: A. •-8cosxsinx B. 0-8cos-x C. © -4cosxsinx D. 0-8cos2x.sin2

Let  y = ln⁡(cos ⁡x ). Which of the following is dy/dx?*1/ln⁡(cos ⁡x )cot⁡x-tan⁡x-sec⁡x

Find the general solution of the following differential equations.(a) ysinxdx + (y3 - 2y2 cosx + cosx)dy = 0

Finn generell løsning til ligningeney′′ + 3 y′ + 2 y = 0a)y′′ − 2 y′ + y = cos tb)y′′ − y′ − 2 y = e2tc)y′′ + 3 y = 5 + 3t2d)y′′ + y′ − 2 y = 6te−2t + 10 sin t