Math

QuestionFind the equation that relates ww and zz given the pairs: (18, 2), (45, 5), (81, 9).

Studdy Solution

STEP 1

Assumptions1. The relationship between ww and zz is proportional, which means ww is directly proportional to zz. . We can write the relationship as w=kzw = kz, where kk is the constant of proportionality.

STEP 2

To find the constant of proportionality kk, we can use the given values of ww and zz from the table.
k=wzk = \frac{w}{z}

STEP 3

Now, plug in the given values for ww and zz from the first row of the table to calculate kk.
k=182k = \frac{18}{2}

STEP 4

Calculate the value of kk.
k=182=9k = \frac{18}{2} =9

STEP 5

Now that we have the constant of proportionality, we can write the equation that describes the relationship between ww and zz.
w=kzw = kz

STEP 6

Substitute the value of kk into the equation.
w=9zw =9zSo, the equation that describes the relationship between ww and zz is w=9zw =9z.

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