Solve the following exercises based on Principles 18 through 21, although an exercise may require the application oftwo or more of any of the principles. Where necessary, round linear answers in inches to 3 decimal places and millimeters to 2 decimal places. Round angular answers in decimal degrees to 2 decimal places and degrees and minutes to the nearest minute. a. If E F ⌢ = 84 ° , find (1) ∠ EFD (2) H F ⌢ (3) ∠1 b. If E F ⌢ = 79 ° , find (1) ∠ EFD (2) H F ⌢ (3) ∠1

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Answer 1

Textbook Question

Chapter 56, Problem 20A

Solve the following exercises based on Principles 18 through 21, although an exercise may require the application oftwo or more of any of the principles. Where necessary, round linear answers in inches to 3 decimal places and millimeters to 2 decimal places. Round angular answers in decimal degrees to 2 decimal places and degrees and minutes to the nearest minute.

a. If E F ⌢ = 84 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
b. If E F ⌢ = 79 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
Chapter 56, Problem 20A, Solve the following exercises based on Principles 18 through 21, although an exercise may require

Expert Solution

To determine

(a)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 1

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Expert Solution

To determine

(b)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 2

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

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Answer 2

Textbook Question

Chapter 56, Problem 20A

Solve the following exercises based on Principles 18 through 21, although an exercise may require the application oftwo or more of any of the principles. Where necessary, round linear answers in inches to 3 decimal places and millimeters to 2 decimal places. Round angular answers in decimal degrees to 2 decimal places and degrees and minutes to the nearest minute.

a. If E F ⌢ = 84 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
b. If E F ⌢ = 79 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
Chapter 56, Problem 20A, Solve the following exercises based on Principles 18 through 21, although an exercise may require

Expert Solution

To determine

(a)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 1

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Expert Solution

To determine

(b)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 2

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

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Answer 3

Textbook Question

Chapter 56, Problem 20A

Solve the following exercises based on Principles 18 through 21, although an exercise may require the application oftwo or more of any of the principles. Where necessary, round linear answers in inches to 3 decimal places and millimeters to 2 decimal places. Round angular answers in decimal degrees to 2 decimal places and degrees and minutes to the nearest minute.

a. If E F ⌢ = 84 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
b. If E F ⌢ = 79 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
Chapter 56, Problem 20A, Solve the following exercises based on Principles 18 through 21, although an exercise may require

Expert Solution

To determine

(a)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 1

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Expert Solution

To determine

(b)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 2

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

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Answer 4

Textbook Question

Chapter 56, Problem 20A

Solve the following exercises based on Principles 18 through 21, although an exercise may require the application oftwo or more of any of the principles. Where necessary, round linear answers in inches to 3 decimal places and millimeters to 2 decimal places. Round angular answers in decimal degrees to 2 decimal places and degrees and minutes to the nearest minute.

a. If E F ⌢ = 84 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
b. If E F ⌢ = 79 ° , find
(1) ∠EFD
(2) H F ⌢
(3) ∠1
Chapter 56, Problem 20A, Solve the following exercises based on Principles 18 through 21, although an exercise may require

Expert Solution

To determine

(a)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 1

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Expert Solution

To determine

(b)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 2

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

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Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution

To determine

(a)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 1

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Expert Solution

To determine

(b)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 2

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Answer 8

Expert Solution

To determine

(a)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 1

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Answer 9

Expert Solution

Answer 10

Expert Solution

Answer 11

Expert Solution

Answer 12

To determine

(a)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer 13

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Answer 14

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 1

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Answer 15

Expert Solution

To determine

(b)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 2

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc. So,

∠HFP= HF⌢2HF⌢=2×∠HFPHF⌢=2×58°HF⌢=116°

To calculate the value of angle 1, let us first calculate the value of arc FEH.

EH⌢=360°−(79°+116°)EH⌢=165°FEH⌢=FE⌢+EH⌢FEH⌢=79°+165°FEH⌢=244°

Similarly, for angle 1, the angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

∠1= FEH⌢2∠1=244°2∠1=122°

Conclusion:

Thus, the value of ∠EFD , HF⌢ and ∠1 are

∠EFD=42°

HF⌢=116°

∠1=122°

Answer 16

Expert Solution

Answer 17

Expert Solution

Answer 18

Expert Solution

Answer 19

To determine

(b)

The value of ∠EFD , HF⌢,and ∠1 in the given figure.

Answer 20

Answer to Problem 20A

The value of ∠EFD , HF⌢,and ∠1 are

DC⌢=76.00°

∠EOD=31.00°

AC⌢=134.00°

Answer 21

Explanation of Solution

Given information:

EF⌢=84°

The given figure is

Mathematics For Machine Technology, Chapter 56, Problem 20A , additional homework tip 2

Calculation:

The angle drawn at the point of tangent between the tangent and the chord is equal to half the value of intercepted arc.

The angle EFD, is the angle between the tangent DF and the chord EF, thus, the value of angle EFD will be equal to

∠EFD= EF⌢2∠EFD=84°2=42°∠EFD=42°

The line DFP is the straight line, the angle at the straight line is 180^o. The value of angle FHP is to be calculated for calculating the value of arc HF.

∠EFD+∠EFH+∠HFP=180°42°+87°+∠HFP=180°∠HFP=180°−(42°+87°)∠HFP=58°