1 Answer

Rishabh Dutt Sharma · Answer 1 · 2018-01-09T23:52:49+0000

Answer:

$\displaystyle f'(x) = 2x + 1$

General Formulas and Concepts:

Pre-Algebra

Order of Operations: BPEMDAS

Distributive Property

Algebra I

Calculus

Limits

Limit Rule [Variable Direct Substitution]:
$\displaystyle \lim_(x \to c) x = c$

Derivatives

Derivative Notation

Explanation:

Step 1: Define

Identify

f(x) = x² + x - 2

Step 2: Differentiate

Substitute in function [Limit Process]:
$\displaystyle f'(x) = \lim_(h \to 0) ([(x + h)^2 + (x + h) - 2] - (x^2 + x - 2))/(h)$
[Brackets] Expand:
$\displaystyle f'(x) = \lim_(h \to 0) ([x^2 + 2hx + h^2 + x + h - 2] - (x^2 + x - 2))/(h)$
[Distributive Property] Distribute negative:
$\displaystyle f'(x) = \lim_(h \to 0) (x^2 + 2hx + h^2 + x + h - 2 - x^2 - x + 2)/(h)$
Combine like terms:
$\displaystyle f'(x) = \lim_(h \to 0) (2hx + h^2 + h)/(h)$
Factor:
$\displaystyle f'(x) = \lim_(h \to 0) (h(2x + h + 1))/(h)$
Simplify:
$\displaystyle f'(x) = \lim_(h \to 0) 2x + h + 1$
Evaluate limit [Limit Rule - Variable Direct Substitution]:
$\displaystyle f'(x) = 2x + 0 + 1$
Simplify:
$\displaystyle f'(x) = 2x + 1$

Topic: AP Calculus AB/BC (Calculus I/I + II)

Unit: Derivatives

Book: College Calculus 10e

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