All the following are steps necessary for writing equation of the tangent line to a curve at the point ( a , f ( a )) except:

Evaluate the second derivative to obtain f'' ( a )

Write equation of the tangent line in point slope form: T ( x ) – f ( a ) = f ' ( a ) ( x – a )

Evaluate f ' ( a ) to obtain the slope of the tangent line

How can we minimize the error of an approximation in a linear approximation at the point ( a , f ( a ))?

By restricting the values of x sufficiently close to ' a '

By translating the point of tangency in either direction

By restricting the values of f ( x ) sufficiently close to f ( a )

By iterating further away from the point of tangency

Will a linear approximation to the graph of f ( x ) = –x 2 +3x overestimate the actual function values of f ? Explain why or why not.

Yes, it will overestimate actual function values because due to the concavity of f , any tangent drawn will be above the curve

No, it will not overestimate actual function values

Yes, it will overestimate actual function values because f is concave upward

Linear Approximation

Authored by Winston Martey

Mathematics

11th - 12th Grade

CCSS covered

Used 201+ times

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13 questions

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MULTIPLE CHOICE QUESTION

3 mins • 1 pt

Suppose f(x) = x³ – x.
Use a linear approximation at x = 2 to estimate f(2.5).

10.5

11.5

Tags

CCSS.HSF.IF.B.6

MULTIPLE CHOICE QUESTION

3 mins • 1 pt

Use the linear approximation of a function at x = 25 to estimate the value of $\sqrt{23}$ to the nearest tenth.

4.6

4.7

4.8

4.9

Tags

CCSS.HSF.IF.B.6

CCSS.HSF.LE.A.2

MULTIPLE CHOICE QUESTION

1 min • 1 pt

Suppose f (x) = 3x² is graphed in the x-y plane. Will any linear approximations to f overestimate or underestimate the actual function values?

overestimate

underestimate

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

f(4) = 1
f'(4) = 3
Using a linear approximation centered at 4, f(4.5) ≈

5/2

3/2

4/3

7/3

Tags

CCSS.8.EE.B.5

MULTIPLE CHOICE QUESTION

3 mins • 1 pt

f(x) = x²(x+1)²
Which of these is the linear approximation to f centered at x = 1?

L(x) = 12x - 1

L(x) = 6x + 5

L(x) = 12x - 8

L(x) = 12x - 16

Tags

CCSS.HSF.IF.B.4

CCSS.HSF.IF.C.7

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

The slope of the line tangent to the graph y = cos(x) at the point x = π/6 is –1/2. What is the linear approximation of cos(x) at π/6 ?

L(x) = –1/2(x – π/6) + √(2)/2

L(x) = –1/2(x – π/6) + 1/2

L(x) = –1/2(x – π/6) + √(3)/2

L(x) = –1/2(x – π/6) – 1/2

Tags

CCSS.HSF.LE.A.2

CCSS.HSF.IF.A.2

CCSS.HSF.BF.A.1

MULTIPLE CHOICE QUESTION

5 mins • 1 pt

f(x) = x^-2/5
Use a linear approximation centered at x = 32 to approximate (30)^-2/5.

17/180

25/64

23/128

41/160

Tags

CCSS.HSF.LE.A.2

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

Which of the following does not necessarily represent a derivative?

Slope of a tangent line to a curve

The limit of the difference quotient as $\Delta x$ approaches zero

A function derived from another function

The instantaneous rate of change of a function

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Linear Approximation

Suppose f(x) = x³ – x.
Use a linear approximation at x = 2 to estimate f(2.5).

Use the linear approximation of a function at x = 25 to estimate the value of $\sqrt{23}$ to the nearest tenth.

Suppose f (x) = 3x² is graphed in the x-y plane. Will any linear approximations to f overestimate or underestimate the actual function values?

f(4) = 1
f'(4) = 3
Using a linear approximation centered at 4, f(4.5) ≈

f(x) = x²(x+1)²
Which of these is the linear approximation to f centered at x = 1?

The slope of the line tangent to the graph y = cos(x) at the point x = π/6 is –1/2. What is the linear approximation of cos(x) at π/6 ?

f(x) = x^-2/5
Use a linear approximation centered at x = 32 to approximate (30)^-2/5.

Which of the following represents the linear approximation to f (x) at the point (c, f(c)) ?

Which of the following does not necessarily represent a derivative?

All the following are steps necessary for writing equation of the tangent line to a curve at the point (a, f(a)) except:

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Similar Resources on Wayground

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Linear Approximation

Suppose f(x) = x3 – x.Use a linear approximation at x = 2 to estimate f(2.5).

Use the linear approximation of a function at x = 25 to estimate the value of 23\sqrt{23}23​ to the nearest tenth.

Suppose f (x) = 3x2 is graphed in the x-y plane. Will any linear approximations to f overestimate or underestimate the actual function values?

f(4) = 1f'(4) = 3Using a linear approximation centered at 4, f(4.5) ≈

f(x) = x2(x+1)2Which of these is the linear approximation to f centered at x = 1?

The slope of the line tangent to the graph y = cos(x) at the point x = π/6 is –1/2. What is the linear approximation of cos(x) at π/6 ?

f(x) = x-2/5Use a linear approximation centered at x = 32 to approximate (30)-2/5.

Which of the following represents the linear approximation to f (x) at the point (c, f(c)) ?

Which of the following does not necessarily represent a derivative?

All the following are steps necessary for writing equation of the tangent line to a curve at the point (a, f(a)) except:

Access all questions and much more by creating a free account

Similar Resources on Wayground

Popular Resources on Wayground

Discover more resources for Mathematics

Suppose f(x) = x³ – x.
Use a linear approximation at x = 2 to estimate f(2.5).

Use the linear approximation of a function at x = 25 to estimate the value of $\sqrt{23}$ to the nearest tenth.

Suppose f (x) = 3x² is graphed in the x-y plane. Will any linear approximations to f overestimate or underestimate the actual function values?

f(4) = 1
f'(4) = 3
Using a linear approximation centered at 4, f(4.5) ≈

f(x) = x²(x+1)²
Which of these is the linear approximation to f centered at x = 1?

f(x) = x^-2/5
Use a linear approximation centered at x = 32 to approximate (30)^-2/5.