Ayub is making 1/4 foot long bracelets for each of his friends. He 1 1/2 feet of cord to make the bracelets. How many bracelets. How many bracelets can he make?
A 6 bracelets
B 1/3 bracelets
C 8/8 bracelets
D 0. He doesn't have enough cord.
To find the number of bracelets Ayub can make, we need to divide the total length of cord he has by the length of each bracelet. Ayub has 1 1/2 feet of cord, and each bracelet is 1/4 foot long.
To divide fractions, we multiply the first fraction (1 1/2) by the reciprocal (or flip) of the second fraction (1/4).
1 1/2 * 4/1 = (3/2) * (4/1) = 12/2 = 6
Therefore, Ayub can make 6 bracelets.
The answer is A. 6 bracelets.
To find out how many bracelets Ayub can make, we need to divide the total length of cord he has by the length of cord needed to make one bracelet.
Ayub has 1 1/2 feet of cord, which is equivalent to (2/2 + 1/2) = 3/2 feet.
Each bracelet requires 1/4 foot of cord.
To determine how many bracelets Ayub can make, we divide the total length of cord by the length of cord needed for each bracelet:
(3/2) ÷ (1/4) = (3/2) * (4/1) = (3/1) * (2/1) = 6.
Therefore, Ayub can make 6 bracelets.
The answer is A. 6 bracelets.
To find out how many bracelets Ayub can make, we need to divide the total length of cord he has (1 1/2 feet) by the length of each bracelet (1/4 foot).
First, let's convert 1 1/2 feet into an improper fraction.
1 1/2 feet = (2/2 + 1/2) feet = 3/2 feet
Now, we can divide the total length of cord (3/2 feet) by the length of each bracelet (1/4 foot):
(3/2) ÷ (1/4) = (3/2) * (4/1) = 12/2 = 6
Ayub can make 6 bracelets, so the answer is A) 6 bracelets.