How do you translate "the quotient of twice a number t and 12" into a mathematical expression?

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How do you translate "the quotient of twice a number t and 12" into a mathematical expression?

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Answer 1 · 2018-05-30T10:12:25

See a solution process below:

Explanation:

the quotient of is the result of dividing two terms
The first term is - Twice a number $t$ : $2t$
The second term is - and 12: $12$

$2t -: 12$ or $(2t)/12$

Answer 2 · 2018-05-30T10:21:48

Literally: $\frac{2t}{12}$

Simplified: $\frac{t}{6}$

Explanation:

Let's translate the expression: "the quotient of $x$ and $y$ " means that we will have to divide the numbers: $\frac{x}{y}$

In this case, $x$ is described as "twice a number $t$ ". Twice a number means that number multiplied by $2$ , so twice a number $t$ translates as $2t$

So, the fraction is $\frac{2t}{12}$ , which can be simplified into $\frac{t}{6}$

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How do you translate "the quotient of twice a number t and 12" into a mathematical expression?

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