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Solution for 297.5 is what percent of 43:

297.5:43*100 =

(297.5*100):43 =

29750:43 = 691.86046511628

Now we have: 297.5 is what percent of 43 = 691.86046511628

Question: 297.5 is what percent of 43?

Percentage solution with steps:

Step 1: We make the assumption that 43 is 100% since it is our output value.

Step 2: We next represent the value we seek with {x}.

Step 3: From step 1, it follows that {100\%}={43}.

Step 4: In the same vein, {x\%}={297.5}.

Step 5: This gives us a pair of simple equations:

{100\%}={43}(1).

{x\%}={297.5}(2).

Step 6: By simply dividing equation 1 by equation 2 and taking note of the fact that both the LHS
(left hand side) of both equations have the same unit (%); we have

\frac{100\%}{x\%}=\frac{43}{297.5}

Step 7: Taking the inverse (or reciprocal) of both sides yields

\frac{x\%}{100\%}=\frac{297.5}{43}

\Rightarrow{x} = {691.86046511628\%}

Therefore, {297.5} is {691.86046511628\%} of {43}.

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Solution for 43 is what percent of 297.5:

43:297.5*100 =

(43*100):297.5 =

4300:297.5 = 14.453781512605

Now we have: 43 is what percent of 297.5 = 14.453781512605

Question: 43 is what percent of 297.5?

Percentage solution with steps:

Step 1: We make the assumption that 297.5 is 100% since it is our output value.

Step 2: We next represent the value we seek with {x}.

Step 3: From step 1, it follows that {100\%}={297.5}.

Step 4: In the same vein, {x\%}={43}.

Step 5: This gives us a pair of simple equations:

{100\%}={297.5}(1).

{x\%}={43}(2).

Step 6: By simply dividing equation 1 by equation 2 and taking note of the fact that both the LHS
(left hand side) of both equations have the same unit (%); we have

\frac{100\%}{x\%}=\frac{297.5}{43}

Step 7: Taking the inverse (or reciprocal) of both sides yields

\frac{x\%}{100\%}=\frac{43}{297.5}

\Rightarrow{x} = {14.453781512605\%}

Therefore, {43} is {14.453781512605\%} of {297.5}.