Differentiate the following from first principles: (a) #y=10x# (b) #y=6-5x+x^2#?

1 Answer
Steve M
May 27, 2017

a) #dy/dx = 10#

b) #dy/dx= -5+2x #

Explanation:

By definition of the derivative:

# dy/dx = f'(x)=lim_(h rarr 0) ( f(x+h)-f(x) ) / h #

Part (A)

With # y=10x # we have;

# dy/dx = lim_(h rarr 0) ( {10(x+h)} -{10x} ) / h #
# " " = lim_(h rarr 0) ( 10x+10h-10x ) / h #
# " " = lim_(h rarr 0) ( 10h ) / h #
# " " = lim_(h rarr 0) ( 10 )#
# " " = 10#

Part (B)

With # y=6-5x+x^2 # we have;

# dy/dx = lim_(h rarr 0) ( {6-5(x+h)+(x+h)^2} -{6-5x+x^2} ) / h #
# " " = lim_(h rarr 0) ( 6-5x-5h+x^2+2hx+h^2 -6+5x-x^2 ) / h #
# " " = lim_(h rarr 0) ( -5h+2hx+h^2 ) / h #
# " " = lim_(h rarr 0) ( -5+2x+h ) #
# " " = -5+2x #

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