1 Answer

Chris Coyier · Answer 1 · 2023-04-17T07:35:47+0000

Answer:

Based on the results above, the slope of the tangent line to the curve at P(25,10) is 0.1.

Explanation:

P(25, 10) lies on the curve:

Q is the point (x, √x+5).

For any value of x, the slope of the secant line PQ is determined using the formula:

$\text{ Slope of secant PQ}=((√(x)+5)-10)/(x-25)$

(a)When x=25.1

$\text{Slope of secant PQ}=((√(25.1)+5)-10)/(25.1-25)=0.0999$

(b)When x=25.01

$\text{Slope of secant PQ}=((√(25.01)+5)-10)/(25.01-25)=0.09999$

(c)When x=24.9

$\text{Slope of secant PQ}=((√(24.9)+5)-10)/(24.9-25)=0.1001$

(d)When x=24.99

$\text{Slope of secant PQ}=((√(24.99)+5)-10)/(24.99-25)=0.10001$

Based on the results above, the slope of the tangent line to the curve at P(25,10) is 0.1.

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