ncert cbse 11th chapter 13 limits and derivatives
1
(i) find the derivative of (-x) using first principles
let f(x) = (-x)
let h be a small increment in x
f(x+h) = -(x+h)
f(x+h) - f(x) = [ -(x+h)] - [-x] = -x-h+x = (-h)
{f(x+h) - f(x)} / {h} = (-h) / {h} = (-1)
taking limit as h --> 0
f ' (x) = (-1)
(ii) find the derivative of [ (-x)^(-1) ] using first principles
let f(x) = [ (-x)^(-1) ]
f(x) = (-1) / [x]
f(x+h) = (-1) / [x+h]
f(x+h) - f(x) = [(-1) / [x+h] ] - [ (-1) / [x] ]
={(-x+x+h) / x(x+h)}
=h / x(x+h)
{f(x+h) - f(x)} / {h} = 1 / [ x(x+h) ]
taking limit as h --> 0
=1/[(x^2)]
13. limits and derivatives
miscellaneous exercise
miscellaneous exercise
1.
(i) find the derivative of (-x) using first principles
solution
(ii) find the derivative of [ (-x)^(-1) ] using first principles
(i) find the derivative of (-x) using first principles
solution
(ii) find the derivative of [ (-x)^(-1) ] using first principles
solution
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