Back to: Further Mathematics SS2
DERIVATIVE OF TRIGONOMETRIC FUNCTIONS
The derivative of y = sin x dy/dx = cos x
The derivative of y = cos x dy/dx = – sin x
The derivative of y= tan x dy/dx = sec2 x\
The derivative of y = sec x dy/dx = secxtanx
The derivative of y = cosec x dy/dx = cosec x cot x
The derivative of y = cot x dy/dx = – cosec2 x
Examples
(1) If y = cos 2x
dy/dx = – sin2x x d/dx ( 2x)
dy/dx = -2 sin 2x
( 2) If y = cos2 x
Let u = cos x and y = u2
dy/du= 2u and du/dx= -sinx
dy/dx = 2u x – sinx
dy/dx = – 2 cos x sin x
( 3) If y = sec 6x
Let u = 6x and y= sec x
du/dx = 6 and dy/du = sec u tan u
dy/dx = 6 sec u tan u
dy/dx = 6 sec 6x tan 6x
EVALUATION
Differentiate the followings : (i) y = tan 8x (ii) y= cot 5x (iii) y = sin4 x
THE DERIVATIVE OF LOGARITHMIC FUNCTIONS
If y = loge x dy/dx = 1/x(note that logex=lnx)
Examples
(1) If y =loge ( 3x + 2 )
dy/dx =dy/du x du/dx
Let u = 3x +2 and y = loge u
du/dx = 3 and dy/du = 1/u
dy/du = 1/u x 3 = 3/3x + 2
(2) If y = loge( 4x – 1) 2
Let u = ( 4x – 1 )2 and y = loge u
du/dx = du/dv x dv/dx where v = 4x – 1
du/dx =2v x 4 = 8v
dy/du = 1/u
dy/dx =dy/dx x du/dx = 1/u x 8v
dy/dx = 8 (4x – 1)/(4x – 1)2
dy/dx = 8 /4x-1
EVALUATION
Differentiate the followings: ( i) y = loge 8x (ii) y = ln ( 6x + 9 )3 (iii) y = ln (3x2 – 5x +6)
THE DERIVATIVE OF EXPONENTIAL FUNCTIONS
If y = exdy/dx = ex
Examples
(1) If y = e2x
dy/dx = dy/du x du/dx
u = 2x and y = eu
du/dx = 2 and dy/du = eu
dy/dx = eu x 2
dy/dx = e2x x 2
dy/dx = 2 e2x
(2) If y = esin4x
dy/dx = dy/du x du/dx
Let u = sin 4x and y = eu
du/dx = 4 cos 4x and dy/du = eu
dy/dx =eu x 4 cos 4x
dy/dx = esin xx 4 cos 4x
dy/dx = 4 esin4xcos 4x
EVALUATION
Differentiate the followings : (i) y = etan 7x (ii) y = e6x (iii) y = e-5sin3x
GENERAL EVALUATION
(1) Find the derivative of each of the following functions : (i) sin3 x (ii) cosec x2
(2) Find the derivative of each of the following functions ; (i) log ( x2 -5x + 6 )
(3) Differentiate each of the followings : (i) ecosec x (ii) ex – e-x
(4) Differentiate log ( cos x + sin x )
Reading Assignment : New Further M aths Project 2 page 13o – 137
WEEKEND ASSIGNMENT
1) If y = loge ( 1/x) find dy/dx a) 1/x b) -1/x c) 1/x2 d) -1/x2
2) If y = 3 e5x find dy/dx a) 3e5x b) 15e3x c) 15e5x d) 5e5x
3) If y = sin 4x find dy/dx a) 4 cos 4x b) -4cos4x c) 4sin4x d) 4tan 4x
4) If y = cot 7x finddy/dx a) 7sec2 x b) -7cosec2 x c) -7cosec2 7x d) 7 tan 7x
5) Differentiate sin x – cos x a) sinx + cosx b) cosx – sinx c) sinx- cosx d) -sinx-cosx
THEORY
1) Differentiate the followings ; (i) cos3 x (ii) sin 4x (iii) ecos 5x (iv) cos4x3
2) Differentiate the followings : (i) ln sin x (ii) log ( x2 – 2) (iii) log ( 1 + x )4
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