Question

For the quantities below, \( x<y \) and \( x \) and \( y \) are both integers. Quantity A: \( x^5 y^3 \)
Quantity B: \( x^4 y^4 \)

• A. Quantity A is greater.
• B. Quantity B is greater.
• C. The two quantities are equal.
• D. The relationship cannot be determined from the information provided.

Hint:

When comparing algebraic expressions, factorize and reduce to a ratio. It often simplifies the comparison significantly.

Answer 1

The Correct Option is B

Step 1: Compare the two quantities.
We are given: \[ \text{Quantity A} = x^5 y^3, \quad \text{Quantity B} = x^4 y^4 \]
Step 2: Factorize.
\[ \frac{\text{Quantity A}}{\text{Quantity B}} = \frac{x^5 y^3}{x^4 y^4} = \frac{x}{y} \]
Step 3: Analyze the ratio.
Since \( x<y \) and both are integers, we know: \[ \frac{x}{y}<1 \] Therefore, \[ \text{Quantity A}<\text{Quantity B} \]
Final Answer: \[ \boxed{\text{Quantity B is greater.}} \]