ncert cbse 11th limits and derivatives miscellaneous exercise
1
(iii)find the derivative of sin(x+1) using first principles
(iii)find the derivative of sin(x+1) using first principles
f(x) = sin(x+1)
f(x+h) = sin[(x+h) +1]
f(x+h) - f(x) = sin[(x+h) +1] - sin[x+1]
using trigonometry formula trigonometry identities
sinx - siny =2cos[(x+y)/2] sin [(x-y)/2]
f(x+h) - f(x) = sin[(x+h) +1] - sin[x+1]
=2cos{ [(x+h) +1 +x+1 ] /2 } sin{ [(x+h) +1 - (x+1) ] /2}
=2cos{(2x+h+2)/2}sin{h/2}
[f(x+h) - f(x)] / h =[2cos{(2x+h+2)/2}sin{h/2} / h
=cos{(2x+h+2)/2} * [ sin(h/2) / (h/2) ] --------------(1)
using lim [ (sinx)/x ] =1 as x -->0
taking lim as h --> 0 in equation(1)
f ' (x) = cos{(2x+0+2)/2} *[1]
f ' (x) = cos{x+1} cancelling off the 2
(iv) find the derivative of cos[x-(pi/8)] using first principles
f(x) =cos[x-(pi/8)]
f(x+h) =cos[x+h-(pi/8)]
f(x+h) - f(x) = cos[x+h-(pi/8)] - cos[x-(pi/8)]
using trigonometry formula trigonometry identities
cosx - cosy = -2sin[(x+y)/2] sin[(x-y)/2]
f(x+h) - f(x) = cos[x+h-(pi/8)] - cos[x-(pi/8)]
=-2sin{ {[x+h-(pi/8)]+[x-(pi/8)]}/2 }sin{ {[x+h-(pi/8)] - [x-(pi/8)]}/2 }
= (-2)sin{ {2[x-(pi/8)]+h}/2 } sin(h/2)
[f(x+h) - f(x)] / h =[ -2sin{ {2[x-(pi/8)]+h}/2 } sin(h/2) ] / h
= -sin{ {2[x-(pi/8)]+h}/2 }* [ sin(h/2) / (h/2) ] --------------(1)
using lim [ (sinx)/x ] =1 as x -->0
f(x) =cos[x-(pi/8)]
f(x+h) =cos[x+h-(pi/8)]
f(x+h) - f(x) = cos[x+h-(pi/8)] - cos[x-(pi/8)]
using trigonometry formula trigonometry identities
cosx - cosy = -2sin[(x+y)/2] sin[(x-y)/2]
f(x+h) - f(x) = cos[x+h-(pi/8)] - cos[x-(pi/8)]
=-2sin{ {[x+h-(pi/8)]+[x-(pi/8)]}/2 }sin{ {[x+h-(pi/8)] - [x-(pi/8)]}/2 }
= (-2)sin{ {2[x-(pi/8)]+h}/2 } sin(h/2)
[f(x+h) - f(x)] / h =[ -2sin{ {2[x-(pi/8)]+h}/2 } sin(h/2) ] / h
= -sin{ {2[x-(pi/8)]+h}/2 }* [ sin(h/2) / (h/2) ] --------------(1)
using lim [ (sinx)/x ] =1 as x -->0
taking lim as h --> 0 in equation(1)
f ' (x) = - sin[x-(pi/8)]
f ' (x) = - sin[x-(pi/8)]
miscellaneous exercise
1.
(i) find the derivative of (-x) using first principles
solution
(ii) find the derivative of [ (-x)^(-1) ] using first principles
solution(i) find the derivative of (-x) using first principles
solution
(ii) find the derivative of [ (-x)^(-1) ] using first principles
(iii)find the derivative of sin(x+1) using first principles
(iv) find the derivative of cos[x-(pi/8)] using first principles
solution
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(iv) find the derivative of cos[x-(pi/8)] using first principles
solution
disclaimer:
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