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505-555 (Easy)|   Geometry|      
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The total area of the smaller circle is what percent of the total area 23 Apr 2018, 21:48
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D
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The total area of the smaller circle is what percent of the total area of the larger circle?

(1) The length of the radius of the larger circle is 300 percent longer than the length of the radius of the smaller circle.
(2) The ratio of the length of the radius of the larger circle to the length of the radius of the smaller circle is 4 to 1.
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D
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The total area of the smaller circle is what percent of the total area 23 Apr 2018, 23:18
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Solution



Given:
• Two circles are there – smaller and larger

To find:
• The total area of the smaller circle is what percent of the total area of the larger circle

Approach and Working:
• If we assume the radius of the smaller circle as r and the radius of the larger circle as R, then
    o Area of the smaller circle = πr2
    o Area of the larger circle = πR2
• Therefore, area of the smaller circle as a percentage of the area of the larger circle = πr2/ πR2 = r2/R2 = (r/R)2
• Or, if we can find out the ratio of their radii, we can find out the answer

Analysing Statement 1
• As per the information given in Statement 1, R is 300% longer than r.
    o Or, [(R – r)/ r] * 100 = 300
    Solving, R = 4r
    Or, r/R = ¼
• From this Statement we can find out the ratio of r and R
    o Therefore, Statement 1 alone is sufficient to answer

Analysing Statement 2
• As per the information given in Statement 2, the ratio of R and r = 4:1
    o Therefore, r/R = 1:4
• From this Statement also, we can find out the ratio of r and R
    o Therefore, Statement 2 alone is sufficient to answer
Hence, the correct answer is Option D

Answer: D
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The total area of the smaller circle is what percent of the total area 09 May 2018, 19:57
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Area of smaller circle is what percent of larger circle
RS= radius of smaller
RL= radius of larger

= Area of smaller*100/Area of larger
=πRS^2*100/πRL^2

=((RS/RL)^2)*100

So we simply need ratio of two circles to get answer

I) RL=4RS
RATIO is known can calculate
Sufficient

II)RL=4RS
Ratio is known so sufficient

D is answer

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The total area of the smaller circle is what percent of the total area 10 May 2018, 06:26
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The required percent can be found by ratio of area which is square of ratio of radius.

So the question reduces to what is the ratio of radius?



1) The length of the radius of the larger circle is 300 percent longer than the length of the radius of the smaller circle.
R = r (1+3) or, R/r = 4
Sufficient.
2) The ratio of the length of the radius of the larger circle to the length of the radius of the smaller circle is 4 to 1.
R/r = 4
Sufficient.

Answer is D
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The total area of the smaller circle is what percent of the total area 10 May 2018, 07:12
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Through either statement, the ratio of the two radii (4:1 in each case). Rest can be determined.

Hence, D is the answer.

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