What is the equation of the tangent line of #f(x) = 1/x# at # x = 2#?
1 Answer
Feb 8, 2016
4y + x - 4 = 0
Explanation:
To find the equation of the tangent y - b = m(x - a ) , require to find m and a point on the line (a , b ). To obtain m , differentiate f(x) and evaluate at x = 2 . To find (a , b ) evaluate f2)
# f(x) = 1/x = x^-1# differentiate using the 'power rule'
f'(x)
# = -x^-2 =- 1/x^2 # and f'(2)
# = -1/2^2 =- 1/4 = m# also f(2) =
#1/2 rArr (a , b ) = ( 2 , 1/2 ) # equation of tangent :
# y - 1/2 = -1/4(x - 2 )# (multiply through by 4 to eliminate fractions )
hence : 4y - 2 = - x + 2
#rArr 4y + x - 4 = 0 #
