There are some stickers in albums A and B. 50% of the stickers in album A and 20% of the stickers in album B are round stickers. There is an equal number of square stickers in both albums. If there are 51 more round stickers in album A than in album B, how many stickers are there in both albums altogether?

Question

There are some stickers in albums A and B. 50% of the stickers in album A and 20% of the stickers in album B are round stickers. There is an equal number of square stickers in both albums. If there are 51 more round stickers in album A than in album B, how many stickers are there in both albums altogether?

Answer 1

50% of round stickers x

50% of square stickers x
(albums A)

20% of round stickers x/4
80% of square stickers x
(albums B)

Let x = # of square stickers in albums A
So # of round stickers in albums A = x
# of square stickers in albums B = x

# of round stickers in albums B = x/4
Then, x - x/4 = 51
3/4x = 51
x = 51 * 4/3 = 68
The stickers in both albums altogether:
x + x + x/4 + x = 3.25 * 68 = 221