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Brad's average for five quizzes is 86If he wants to have an average of 88for six quizzes, what is the lowestscore he can receive on his sixth quiz?

User Dennis George
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1 Answer

14 votes
14 votes

SOLUTION

Let the sum of Brad's quizzes score be x.

Since


\text{average = }\frac{s\text{um of quiz scores }}{n\text{umber of quizzes}}

It means that


\begin{gathered} 86=(x)/(5) \\ \text{for five quizzes } \end{gathered}

Let the score of the sixth quiz be y, so this means that


88=(x+y)/(6)

From the first equation, we have x as


\begin{gathered} 86=(x)/(5) \\ \text{cross multiply, we have } \\ x=86*5 \\ x=430 \end{gathered}

Now we will substitute x for 430 into the second equation, we have


\begin{gathered} 88=(x+y)/(6) \\ 88=(430+y)/(6) \\ \text{cross multiply, we have } \\ 430+y=88*6 \\ 430+y=528 \\ \text{collecting like terms, y becomes } \\ y=528-430 \\ y=98 \end{gathered}

Hence the answer is 98

User Nadira
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