Jackie ate 1/3 of his crackers on a plate his brother ate 1/4 of crackers. There were 5 crackers left off on the plate. How many crackers were on the plate to begin with?

Let's assume the total number of crackers on the plate to begin with is x.

Jackie ate 1/3 of the crackers, so he ate (1/3)x crackers.
His brother ate 1/4 of the crackers, so his brother ate (1/4)x crackers.

The total number of crackers eaten is (1/3)x + (1/4)x = 5/12x crackers.

The number of crackers left on the plate is x - (1/3)x - (1/4)x = (12/12)x - (4/12)x - (3/12)x = (5/12)x.

Given that there were 5 crackers left on the plate, we know that (5/12)x = 5.

Multiplying both sides of the equation by 12/5, we get (12/5)*(5/12)x = (12/5)*5.

This simplifies to x = 12.

Therefore, the initial number of crackers on the plate was 12. So the answer is 12.