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The cube root of r varies inversely with the square of s. Which two equations model this relationship?​

The Cube Root Of R Varies Inversely With The Square Of S Which Two Equations Model This Relationship class=

Sagot :

Step-by-step explanation:

³√r =(k×1/s²)

³√r = k/s²

The equation given in the option which shows the relationship given in the question is  ∛r = k/s²and  [tex]\rm s^2 r^{1/3} = k[/tex], the correct options are B and C.

What is Inverse Variation?

When a variable varies inversely with the other variable, i.e. on increasing one variable the other decreases is called Inverse Variation.

The statement for modelling the relation is

The cube root of r varies inversely with the square of s.

∛r ∝ (1/s²)

∛r = k/s²

Here k is the proportionality constant

The equations which model this relationship is given by ∛r = k/s²and  [tex]\rm s^2 r^{1/3} = k[/tex].

To know more about Inverse Variation

https://brainly.com/question/11592410

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