///-/:::;((( Find the linearization ofat x = π/6.f(x)= 4 sinx - 3x1*12*132*1 1 *1.L(x)2.L(x)= 2 − 1/π + (2√3 − 3)(x − 2)-3.1|L(x) = 2 + ½3ñ− (2√3+3)(x + 7)5.= 2 − 1 2π + (2√3 − 3)(x + 1)-4.1L(x) = 2 + ½ñ+ (2√3+3) (x + 7)L(x)= 2 + = π − (2√3 − 3)(x − 7)6.L(x) = 2- 1/2₁1 5 * 1 6 * 17 * 10 * 1T-−0*(2√3+3)(x - 5)10*X LL TI 12

Answered: Image /qna-images/answer/a01caf18-c4dd-44e7-8739-dd3b4683b84c.jpg

Find the linearization of at x = π/6. f(x) = 4 sin x - 3x 1. L(x) 2. L(x) = 2 − 1/2 + (2√3 − 3)(x + 1) = 2 − 1/π + (2√3 − 3)(x − 7) 3. 1 L(x) = 2 + ½3ñ − (2√3+3)(x + 7) 4. 1 L(x) = 2 + ½ñ+ (2√3+3) (x + Z) 5. L(x) = 2 + − (2√3 − 3)(x − 7) 6. L(x) = 2 - 1/2₁ - (2√3+3)(x −75) ホー

Find the linearization of at x = π/6. f(x) = 4 sin x - 3x 1. L(x) 2. L(x) = 2 − 1/2 + (2√3 − 3)(x + 1) = 2 − 1/π + (2√3 − 3)(x − 7) 3. 1 L(x) = 2 + ½3ñ − (2√3+3)(x + 7) 4. 1 L(x) = 2 + ½ñ+ (2√3+3) (x + Z) 5. L(x) = 2 + − (2√3 − 3)(x − 7) 6. L(x) = 2 - 1/2₁ - (2√3+3)(x −75) ホー

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter4: Polynomial And Rational Functions

Section: Chapter Questions

Problem 14T

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Question

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///-/:::;(((

Find the linearization of
at x = π/6.
f(x)
= 4 sinx - 3x
1*12*132*1 1 *
1.
L(x)
2.
L(x)
= 2 − 1/π + (2√3 − 3)(x − 2)
-
3.
1
|L(x) = 2 + ½3ñ− (2√3+3)(x + 7)
5.
= 2 − 1 2π + (2√3 − 3)(x + 1)
-
4.
1
L(x) = 2 + ½ñ+ (2√3+3) (x + 7)
L(x)
= 2 + = π − (2√3 − 3)(x − 7)
6.
L(x) = 2
- 1/2₁
1 5 * 1 6 * 17 * 10 * 1
T-
−
0*
(2√3+3)(x - 5)
10*
X LL T
I 12

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