(a)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension a to dimension B is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension a is given by
The measure of dimension B is given by
The ratio of dimension a to dimension B is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension a to Dimension B is
(b)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of Dimension a to Dimension C is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension a is given by
The measure of dimension C is given by
The ratio of dimension a to dimension C is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension a to Dimension C is 
(c)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension C to dimension D is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension C is given by
The measure of dimension D is given by
The ratio of dimension C to dimension D is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension C to Dimension D is 
(d)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension C to dimension E is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension C is given by
The measure of dimension E is given by
The ratio of dimension C to dimension E is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension C to Dimension E is 
(e)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension D to dimension F is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension D is given by
The measure of dimension F is given by
The ratio of dimension D to dimension F is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension D to Dimension F is 
(f)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension F to dimension B is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension F is given by
The measure of dimension B is given by
The ratio of dimension F to dimension B is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension F to Dimension B is 
(g)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension F to dimension C is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension F is given by
The measure of dimension C is given by
The ratio of dimension F to dimension C is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension F to Dimension C is 
(h)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension E to dimension a is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of nearer hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension E is given by
The measure of dimension a is given by
The ratio of dimension E to dimension a is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension E to Dimension a is 
(i)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension D to dimension B is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance the near hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension D is given by
The measure of dimension B is given by
The ratio of dimension D to dimension B is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension D to Dimension B is 
(j)
The indicated ratios in lowest fractional form.
Answer to Problem 19A
The ratio of dimension C to dimension F is 
Explanation of Solution
Given:
The given figure is as follows:
Concept used:
The dimension can be calculated by subtracting the distance of nearer hole from the one which is farther.
Calculation:
From the given figure, it is clear that the measure of dimension C is given by
The measure of dimension F is given by
The ratio of dimension C to dimension F is given by
Thus, the ratio is 
Conclusion:
The ratio of Dimension C to Dimension F is 
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Chapter 18 Solutions
Mathematics for Machine Technology
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