Answer:
f(0.201) ≈ 4.975
Step-by-step explanation:
1. Calculate the position of the point and the slope of the tangent
[tex]f(x) = \dfrac{1}{x}\\\\f'(x) = -\dfrac{1}{x^{2}}[/tex]
When x = 0.2
[tex]f(0.2) = \dfrac{1}{0.2} = 5\\\\f'(0.2) = - \dfrac{1}{0.2^{2}} = -\dfrac{1}{0.04} = -25[/tex]
So, the point is at (0.2, 5) and the slope of the tangent is -25.
2. Calculate the equation of the tangent line
y = mx+ b
Substitute the coordinates of the point
5 = -25×0.2 + b
5 = -5 + b
b = 10
The equation of the tangent line is
y = -25x + 10
3. Calculate y when x = 0.201
y = -25×0.201 + 10 = -5.025 + 10 = 4.975
4. How good is the approximation?
The actual value of f(0.201) is 4.975 124 …
[tex]\text{Percent error} = \dfrac{0.000124}{4.975124} \times 100 \, \% = \mathbf{0.0025 \, \%}[/tex]
