Asked by Surya
There is a ratio of number of boys to girls 3:5. After adding 5 boys and 3 girls, the ratio become 5:7. How many girls were there at first?
Answers
Answered by
Bosnian
b = numbers of boys
g = numbers of girls
Ratio of boys to girls:
b / g = 3 / 5 Multiply both sides by 5
5 b / g = 3 Multiply both sides by g
5 b = 3 g Divide both sides by 5
b = 3 g / 5
After adding ratio is :
( b + 5 ) / ( g + 3 ) = 5 / 7
[ ( 3 g / 5 ) + 5 ] / ( g + 3 ) = 5 / 7 Multiply both sides by 7
7 [ ( 3 g / 5 ) + 5 ] / ( g + 3 ) = 5 Multiply both sides by ( g + 3 )
7 [ ( 3 g / 5 ) + 5 ] = 5 ( g + 3 )
7 * 3 g / 5 + 7 * 5 = 5 ( g + 3 )
21 g / 5 + 35 = 5 ( g + 3 ) Multiply both sides by 5
21 g + 35 * 5 = 5 * 5 ( g + 3 )
21 g + 175 = 25 ( g + 3 )
21 g + 175 = 25 g + 25 * 3
21 g + 175 = 25 g + 75
175 - 75 = 25 g - 21 g
100 = 4 g
4 g = 100 Divide both sides by 4
g = 100 / 4
g = 25
b = 3 g / 5
b = 3 * 25 / 5
b = 75 / 5
b = 15
Checking :
b / g = 15 / 25 =
( 5 * 3 ) / ( 5 * 5 ) = 3 / 5
( b + 5 ) / ( g + 3 ) =
( 15 + 5 ) / ( 25 + 3 ) =
20 / 28 =
( 4 * 5 ) / ( 4 * 7 ) = 5 / 7
g = numbers of girls
Ratio of boys to girls:
b / g = 3 / 5 Multiply both sides by 5
5 b / g = 3 Multiply both sides by g
5 b = 3 g Divide both sides by 5
b = 3 g / 5
After adding ratio is :
( b + 5 ) / ( g + 3 ) = 5 / 7
[ ( 3 g / 5 ) + 5 ] / ( g + 3 ) = 5 / 7 Multiply both sides by 7
7 [ ( 3 g / 5 ) + 5 ] / ( g + 3 ) = 5 Multiply both sides by ( g + 3 )
7 [ ( 3 g / 5 ) + 5 ] = 5 ( g + 3 )
7 * 3 g / 5 + 7 * 5 = 5 ( g + 3 )
21 g / 5 + 35 = 5 ( g + 3 ) Multiply both sides by 5
21 g + 35 * 5 = 5 * 5 ( g + 3 )
21 g + 175 = 25 ( g + 3 )
21 g + 175 = 25 g + 25 * 3
21 g + 175 = 25 g + 75
175 - 75 = 25 g - 21 g
100 = 4 g
4 g = 100 Divide both sides by 4
g = 100 / 4
g = 25
b = 3 g / 5
b = 3 * 25 / 5
b = 75 / 5
b = 15
Checking :
b / g = 15 / 25 =
( 5 * 3 ) / ( 5 * 5 ) = 3 / 5
( b + 5 ) / ( g + 3 ) =
( 15 + 5 ) / ( 25 + 3 ) =
20 / 28 =
( 4 * 5 ) / ( 4 * 7 ) = 5 / 7
Answered by
Surya
Initial:
number of boys to girls 3:5
=3U:5U
U means unit
Later (3U +5): (5U +3) = 5:7
3U+5 5
----- = ---
5U+3 7
Cross multiply
21U+35 = 25U+15
35-15 = 25U-21U
20 = 4U
Therefore 1U =5
Initially girls are 5Units.
So the answer is 25.
number of boys to girls 3:5
=3U:5U
U means unit
Later (3U +5): (5U +3) = 5:7
3U+5 5
----- = ---
5U+3 7
Cross multiply
21U+35 = 25U+15
35-15 = 25U-21U
20 = 4U
Therefore 1U =5
Initially girls are 5Units.
So the answer is 25.
Answered by
Bosnian
My answer is also numbers of girls
g = 25
g = 25
Answered by
Surya
Thanks a lot Bosnian.
Answer is exactly correct. Just wanted to provide the alternate method which got through Maths olympiad book.
Answer is exactly correct. Just wanted to provide the alternate method which got through Maths olympiad book.
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