How do you find the slope of the secant lines of $f (x) = x^{2} - x - 42$ $f (x) = x^2 − x − 42$ at (−5, −12), and (7, 0)?

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How do you find the slope of the secant lines of $f (x) = x^{2} - x - 42$ $f (x) = x^2 − x − 42$ at (−5, −12), and (7, 0)?

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Answer 1 · 2015-10-30T17:14:32

Assuming that the word "lines" should be "line", it is exactly the same as the slope of the line through the points (−5, −12), and (7, 0).

Explanation:

If my interpretation is incorrect, then perhaps you asking for the general equation of a secant line to the curve that includes the point $(- 5, - 12)$ $(-5,-12)$

If that is the question, then the form of the answer will depend on whether you call the second point $(x, f (x))$ $(x,f(x))$ or $(a, f (a))$ $(a,f(a))$ or somthing similar of call it $(- 5 + h, f (- 5 + h))$ $(-5+h, f(-5+h))$

For $(x, f (x))$ $(x,f(x))$ , we find slope:
$m = \frac{f (x) - (- 12)}{x - (- 5)} = \frac{x^{2} - x - 42 + 12}{x + 5} = \frac{x^{2} - x - 30}{x} + 5)$ $m = (f(x)-(-12))/(x-(-5)) = (x^2-x-42 + 12)/(x+5) = (x^2-x-30)/x+5)$

$= \frac{(x - 6) (x + 5)}{x + 5} = x - 6$ $= ((x-6)(x+5))/(x+5) = x-6$ (for $x \neq - 5$ $x != -5$ )

For $(- 5 + h, f (- 5 + h))$ $(-5+h, f(-5+h))$ , we find slope:

$m = \frac{f (- 5 + h) - (- 12)}{(- 5 + h) - (- 5)}$ $m=(f(-5+h)-(-12))/((-5+h)-(-5))$

$= \frac{{(- 5 + h)}^{2} - (- 5 + h) - 42 + 12}{- 5 + h + 5}$ $= ((-5+h)^2-(-5+h)-42+12)/(-5+h+5)$

$= \frac{25 - 10 h + h^{2} + 5 - h - 42 + 12}{h}$ $= (25-10h+h^2+5-h-42+12)/h$

$= \frac{- 10 h + h^{2} - h}{h} = - 11 + h$ $= (-10h+h^2-h)/h = -11+h$ (for $h \neq 0$ $h != 0$ )

The general equation of a secant line to the curve that includes the point $(7, 0)$ $(7, 0)$ is found by similar methods.

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How do you find the slope of the secant lines of $f (x) = x^{2} - x - 42$ $f (x) = x^2 − x − 42$ at (−5, −12), and (7, 0)?

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

How do you find the slope of the secant lines of f(x)=x2−x−42 f (x) = x^2 − x − 42 at (−5, −12), and (7, 0)?

1 Answer

Explanation:

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Impact of this question

How do you find the slope of the secant lines of $f (x) = x^{2} - x - 42$ $f (x) = x^2 − x − 42$ at (−5, −12), and (7, 0)?