To find the quotient of the expression 65y³ ÷ 15y² ÷ 25y ÷ 5y, we can break it down step by step.
Step 1: Simplify the expression
We can rewrite the expression for clarity. Instead of doing all the divisions at once, let’s start by simplifying:
Quotient = 65y³ ÷ 15y² ÷ 25y ÷ 5y
Step 2: Divide step by step
First, let’s divide 65y³ by 15y²:
65y³ ÷ 15y² = (65 ÷ 15) * (y³ ÷ y²) = rac{65}{15} * y^{3-2} = rac{13}{3} * y
Now we have rac{13}{3}y.
Step 3: Divide the result by 25y
Now, take the result rac{13}{3}y and divide it by 25y:
So, we have:
rac{13}{3}y ÷ 25y = rac{13}{3} ÷ 25 (the y’s cancel each other)
Step 4: Divide the result by 5y
Next, divide rac{13}{75} by 5y:
rac{13}{75} ÷ 5y = rac{13}{75} ÷ 5 = rac{13}{75 * 5} = rac{13}{375} y
Final Result
Putting this all together, the final quotient of the original expression:
Quotient = rac{13}{375}y
This is the simplified form of the expression 65y³ ÷ 15y² ÷ 25y ÷ 5y.