jills fish weighs 8 times as much as her parakeet. together the pets weigh 63 ounces. how much does the fish weigh
p = parakeet
p + 8p = 63
9p = 63
p = 63/9
p = 7 ounces
Multiply 7 * 8 to find out what the fish weighs.
7 ounces
Let's assume the weight of the parakeet is represented by "x" ounces.
According to the given information, the weight of the fish is 8 times the weight of the parakeet, so the weight of the fish can be represented as 8x ounces.
Since together the pets weigh 63 ounces, we can set up the equation:
x + 8x = 63
Combining like terms:
9x = 63
To solve for x, we divide both sides of the equation by 9:
x = 63/9
x = 7
Therefore, the weight of the parakeet is 7 ounces.
To find the weight of the fish, we multiply the weight of the parakeet by 8:
Weight of the fish = 8 * 7 = 56 ounces.
So, the fish weighs 56 ounces.
To determine the weight of Jill's fish, we can start by setting up a system of equations. Let's use the variable "x" to represent the weight of the parakeet in ounces.
According to the given information, the fish weighs 8 times as much as the parakeet. Therefore, the weight of the fish can be expressed as 8x.
We also know that the total weight of both pets is 63 ounces. So, we can write the equation:
x + 8x = 63
Combining like terms, we get:
9x = 63
To find the value of x, we can divide both sides of the equation by 9:
9x/9 = 63/9
x = 7
So, the weight of the parakeet is 7 ounces.
To find the weight of the fish, we can substitute the value of x back into the expression 8x:
8 * 7 = 56
Therefore, the fish weighs 56 ounces.