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What happens to the value of the expression (3y)/(2y) as y increases? Choose 1 answer: (A) It increases. (B) It decreases. (c) It stays the same.

What happens to the value of the expression 3y2y \frac{3 y}{2 y} as y y increases?\newlineChoose 11 answer:\newline(A) It increases.\newline(B) It decreases.\newline(C) It stays the same.

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Evaluate variable expressions with decimals, fractions, and mixed numbersright chevron icon

Full solution

Q. What happens to the value of the expression 3y2y \frac{3 y}{2 y} as y y increases?\newlineChoose 11 answer:\newline(A) It increases.\newline(B) It decreases.\newline(C) It stays the same.
  1. Analyze the expression: Let's analyze the expression (3y)/(2y)(3y)/(2y). We can simplify this expression by canceling out the common factor yy from the numerator and the denominator.\newline(3y)/(2y)=3/2(3y)/(2y) = 3/2
  2. Simplify the expression: Since yy is a common factor in both the numerator and the denominator and it cancels out, the expression simplifies to a constant value of 32\frac{3}{2}, which does not depend on yy.
  3. Constant value of the expression: Therefore, as yy increases, the value of the expression 3y2y\frac{3y}{2y} remains unchanged because it is equal to the constant 32\frac{3}{2}.

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