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Resolution for .8 is what p.c of three.25:
.8:3.25*100 =
(.8*100):3.25 =
80:3.25 = 24.615384615385
Now we’ve: .8 is what p.c of three.25 = 24.615384615385
Query: .8 is what p.c of three.25?
Proportion resolution with steps:
Step 1: We make the belief that 3.25 is 100% since it’s our output worth.
Step 2: We subsequent characterize the worth we search with {x}.
Step 3: From step 1, it follows that {100%}={3.25}.
Step 4: In the identical vein, {x%}={.8}.
Step 5: This provides us a pair of easy equations:
{100%}={3.25}(1).
{x%}={.8}(2).
Step 6: By merely dividing equation 1 by equation 2 and being attentive to the truth that each the LHS
(left hand facet) of each equations have the identical unit (%); we’ve
frac{100%}{x%}=frac{3.25}{.8}
Step 7: Taking the inverse (or reciprocal) of either side yields
frac{x%}{100%}=frac{.8}{3.25}
Rightarrow{x} = {24.615384615385%}
Subsequently, {.8} is {24.615384615385%} of {3.25}.
Resolution for 3.25 is what p.c of .8:
3.25:.8*100 =
(3.25*100):.8 =
325:.8 = 406.25
Now we’ve: 3.25 is what p.c of .8 = 406.25
Query: 3.25 is what p.c of .8?
Proportion resolution with steps:
Step 1: We make the belief that .8 is 100% since it’s our output worth.
Step 2: We subsequent characterize the worth we search with {x}.
Step 3: From step 1, it follows that {100%}={.8}.
Step 4: In the identical vein, {x%}={3.25}.
Step 5: This provides us a pair of easy equations:
{100%}={.8}(1).
{x%}={3.25}(2).
Step 6: By merely dividing equation 1 by equation 2 and being attentive to the truth that each the LHS
(left hand facet) of each equations have the identical unit (%); we’ve
frac{100%}{x%}=frac{.8}{3.25}
Step 7: Taking the inverse (or reciprocal) of either side yields
frac{x%}{100%}=frac{3.25}{.8}
Rightarrow{x} = {406.25%}
Subsequently, {3.25} is {406.25%} of {.8}.
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