Statement 1: . ⇒ q(cx + d) = p(ax + b) This process is cross-multiplication. Statement 2: ax + b = c becomes ax = c - b after transposition. Which of the following options is correct? 1. Both the statements are true. 2. Both the statements are false. 3. Statement 1 is true, and statement 2 is false. 4. Statement 1 is false, and statement 2 is true.

Given, On cross-multiplication, ⇒ q(ax + b) = p(cx + d) So, statement 1 is false. Transposition is a fundamental algebraic technique used to isolate a variable by moving terms from one side of an equation to the other. When a term is transposed, its sign changes; - A term added to one side gets subtracted on the other. - A term subtracted from one side gets added on the other. ∴ ax + b = c becomes ax = c - b after transposition. So, statement 2 is true. ∴ Statement 1 is false, and statement 2 is true. Hence, option 4 is the correct option.

Mathematics

Statement 1: $\dfrac{ax + b}{cx + d} = \dfrac{p}{q}$ .
⇒ q(cx + d) = p(ax + b)
This process is cross-multiplication.
Statement 2: ax + b = c becomes ax = c - b after transposition.
Which of the following options is correct?
Both the statements are true.
Both the statements are false.
Statement 1 is true, and statement 2 is false.
Statement 1 is false, and statement 2 is true.

Linear Eqns One Variable

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Answer

Given, $\dfrac{ax + b}{cx + d} = \dfrac{p}{q}$

On cross-multiplication,

⇒ q(ax + b) = p(cx + d)

So, statement 1 is false.

Transposition is a fundamental algebraic technique used to isolate a variable by moving terms from one side of an equation to the other. When a term is transposed, its sign changes;

A term added to one side gets subtracted on the other.
A term subtracted from one side gets added on the other.

∴ ax + b = c becomes ax = c - b after transposition.

So, statement 2 is true.

∴ Statement 1 is false, and statement 2 is true.

Hence, option 4 is the correct option.

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Mathematics

Linear Eqns One Variable

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