How do you solve $A = P + P r t$ $A = P + Prt$ for $t$ $t$ ?

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How do you solve $A = P + P r t$ $A = P + Prt$ for $t$ $t$ ?

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Answer 1 · 2017-03-02T17:11:18

See the entire solution process below:

Explanation:

Step 1) Subtract $P$ $color(red)(P)$ from each side of the equation to isolate the $r$ $r$ term while keeping the equation balanced:

$A - P = - P + P + P r t$ $A - color(red)(P) = -color(red)(P) + P + Prt$

$A - P = 0 + P r t$ $A - P = 0 + Prt$

$A - P = P r t$ $A - P = Prt$

Now, divide each side of the equation by $P t$ $color(red)(P)color(blue)(t)$ to solve for $r$ $r$ while keeping the equation balanced:

$\frac{A - P}{P t} = \frac{P r t}{P t}$ $(A - P)/(color(red)(P)color(blue)(t)) = (Prt)/(color(red)(P)color(blue)(t))$

$(A - P)/(Pt) = (color(red)(cancel(color(black)(P)))rcolor(blue)(cancel(color(black)(t))))/(cancel(color(red)(P))cancel(color(blue)(t)))$

$(A - P)/(Pt) = r$

$r = (A - P)/(Pt)$

Or

$r = A/(Pt) - P/(Pt)$

$r = A/(Pt) - color(red)(cancel(color(black)(P)))/(color(red)(cancel(color(black)(P)))t)$

$r = A/(Pt) - 1/t$

Answer 2 · 2017-03-02T17:19:33

$t=(A-P)/(Pr)$

Explanation:

Given: $" "A=P+Prt$

Factor out the $P$

$A=P(1+rt)$

Divide both sides by P

$A/P=1+rt$

Subtract 1 from both sides

$A/P-1=rt$

Divide both sides by r

$A/(Pr)-1/r=t" "->" "t=A/(Pr)-1/r$

Or could write this as:

$t=(A-P)/(Pr)$

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How do you solve $A = P + P r t$ $A = P + Prt$ for $t$ $t$ ?

2 Answers

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