The area of a rectangle is 54x^9 y^8 square yards. If the length of the rectangle is 6x^3 y^4 which expression represents the width of the rectangle in yards?

Jack knows a=lw, so he writes the following equation:
54x^9 y^8= 6x^3 y^4w
He divides both sides by the length:
(54x^9 y^8)/(6x^3 y^4 )=9 x^12 y^12

Error:

Correct solution:

➷ Error: When he divided both sides by the length, he didn't subtract the exponents. Instead on subtracting the exponents, he added them - which is incorrect.

Correct solution: 54x^9 y^8 / 6x^3 y^4 = 9x^6 y^4

The width is 9x^6 y^4

(This is based on the rule that when you divide values with exponents, you have to subtract the exponents)

✽

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carlosego carlosego · Answer 2 · 2019-03-28T18:06:56+01:00

Answer:

Error: He added the exponents of the variables. The exponents must be subtracted.

Correct solution: [tex]w=9x^6y^4[/tex]

Step-by-step explanation:

According the quotient property of exponents, when you divide two powers with equal base, you must subtract the exponents.

Therefore, keeping the property above on mind, you have:

[tex]w=\frac{54x^9y^8}{6x^3 y^4}\\\\w=9x^{(9-3)}y^{(8-4)}[/tex]

Therefore, you have that the width of the rectangle is the shown below:

[tex]w=9x^6y^4[/tex]