[ad_1]
Resolution for What’s 75. p.c of 150:
75. p.c *150 =
(75.:100)*150 =
(75.*150):100 =
11250:100 = 112.5
Now we have now: 75. p.c of 150 = 112.5
Query: What’s 75. p.c of 150?
Share resolution with steps:
Step 1: Our output worth is 150.
Step 2: We symbolize the unknown worth with {x}.
Step 3: From step 1 above,{150}={100%}.
Step 4: Equally, {x}={75.%}.
Step 5: This leads to a pair of straightforward equations:
{150}={100%}(1).
{x}={75.%}(2).
Step 6: By dividing equation 1 by equation 2 and noting that each the RHS (proper hand aspect) of each
equations have the identical unit (%); we have now
frac{150}{x}=frac{100%}{75.%}
Step 7: Once more, the reciprocal of each side provides
frac{x}{150}=frac{75.}{100}
Rightarrow{x} = {112.5}
Due to this fact, {75.%} of {150} is {112.5}
Resolution for What’s 150 p.c of 75.:
150 p.c *75. =
(150:100)*75. =
(150*75.):100 =
11250:100 = 112.5
Now we have now: 150 p.c of 75. = 112.5
Query: What’s 150 p.c of 75.?
Share resolution with steps:
Step 1: Our output worth is 75..
Step 2: We symbolize the unknown worth with {x}.
Step 3: From step 1 above,{75.}={100%}.
Step 4: Equally, {x}={150%}.
Step 5: This leads to a pair of straightforward equations:
{75.}={100%}(1).
{x}={150%}(2).
Step 6: By dividing equation 1 by equation 2 and noting that each the RHS (proper hand aspect) of each
equations have the identical unit (%); we have now
frac{75.}{x}=frac{100%}{150%}
Step 7: Once more, the reciprocal of each side provides
frac{x}{75.}=frac{150}{100}
Rightarrow{x} = {112.5}
Due to this fact, {150%} of {75.} is {112.5}
[ad_2]