Final answer:
Two whole number division problems with a quotient of 9 and a remainder of 5 can be formed using the formula: Dividend = (Divisor × Quotient) + Remainder. For instance, dividing 95 by 10 or 77 by 8 both yield a quotient of 9 and a remainder of 5.
Step-by-step explanation:
To create two whole number division problems that have the quotient of 9 and remainder of 5, we should use the division formula:
Dividend = (Divisor × Quotient) + Remainder
Applying this formula with the given quotient of 9 and remainder of 5:
- Let's take a divisor of 10, then the dividend would be (10 × 9) + 5 = 95. So, our first division problem is 95 ÷ 10, which equals 9 with a remainder of 5.
- Choosing a different divisor, say 8, our dividend becomes (8 × 9) + 5 = 77. The second division problem is 77 ÷ 8, leading to a quotient of 9 and a remainder of 5 as well.
These problems show how to create division problems with a specific quotient and remainder using basic arithmetic operations and the relationship between multiplication and division.