Introduction

Sub triplicate type of ratio can be defined as the one that is present between cube roots of two different types of numbers. It does not contain any unit of the quantities that is present within the ratio of the two numbers. It can be obtained from the compound ratio and from the triplicate ratio simply by the calculation of the cube roots of the number and the quantities present. By the end of the assessment, an understanding of how to find sub triplicate ratio could be noted.

Sub triplicate ratio definition

Sub triplicate ratio can be defined as the ratio present in between cube roots of two different types of numbers. It can be obtained from the compound ratio and it can be obtained from the triplicate ratios as well. The Triplicate ratio can be found out by the cubes of two similar quantities. The Triplicate ratio can be found out by the cubing of the antecedent and the consequent terms present in the ratio. The only difference between the above-mentioned ratio and the sub-triplicate ratio is that the latter can be found out by the cube root of those two terms that are present in the given ratio. 

How to find sub triplicate ratio values?

A sub triplicate ratio value can be obtained by the cube root of two similar types of numbers. For instance, for the calculation of the sub triplicate ratio of x: y, the resulting ratio is given by the formula. cube root of x: cube root of y. A numerical example can be given in the context of finding sub triplicate ratio values. For example, when individuals want to find the sub-triplicate ratio of the ratio 1: 729, the resulting ratio can be obtained by cube root of 1 and cube root of 729. The cube root of 1 is 1 itself and the cube root of 729 is 9. Hence, the result obtained by the calculation of the cube roots of the given numeric values is 1: 9.  Therefore, it can be seen that the sub-triplicate ratio values can be calculated very easily. 

What is the sub triplicate ratio formula?

Sub triplicate ratio can be obtained by the cube root of the antecedent and the consequent of the quantities of the ratio. The formula for the calculation of sub triplicate ratio is at first finding the cube root of the antecedent, which is present in the ratio. After this, finding the cube root of the consequent is done. After the calculation of the cube roots of antecedent and the consequent, is calculated. 

The sub triplicate ratio formula has been shown using some mathematical examples. For instance, the mentioned ratio of 1: 27 can be calculated by calculating the cube root of 1 and then obtaining the cube root of 27 for finding the resultant sub triplicate ratio. The cube root of 1 is 1 itself and the cube root of 27 is 3. Therefore, the resultant ratio that can be found out by obtaining the cube root of these two numbers and by the formation of the ratio of these two given numbers is 1: 3. However, the triplicate ratio is just the opposite of the sub triplicate ratio.  The triplicate ratio can be calculated from the compound ratio by simply calculating the consequent and the antecedent terms that are present in the ratio. For instance, when two numbers are given in the problem as a and b, their triplicate ratio can be calculated as a3:b3. Therefore, it can be seen that the triplicate ratio can be obtained very easily from the compound ratio and by simply cubing the consequent and the antecedent terms of the given compound ratio.

Similarly, the sub triplicate ratio can be found for 1:64 values and it can be calculated in the similar way. At first, the calculation of the cube root of the antecedent term, which is 1, has been calculated. Then the calculation of the cube root of the constituent term that is 64 has been calculated. The cube root of 1 is 1 itself and the cube root of 64 is 4. Therefore, the resulting ratio that has been obtained using this formula is 1: 4.

Conclusion

It can be concluded that the sub-triplicate ratio can be calculated by the cube root of the two terms that are present in the ratio and then obtaining the ratio of the cube roots of the terms. This ratio has no units as it is used for the representation of comparison or a relation between two similar types of quantities. The percentage can easily be calculated from this ratio by simply multiplying it by 100.