Question:
The graph of $y - x$ against $y + x$ is as shown (straight line with slope>0 through origin). Which of the given five graphs shows $y$ against $x$?
The graph of $y - x$ against $y + x$ is as shown (straight line with slope>0 through origin). Which of the given five graphs shows $y$ against $x$?
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Convert given transformed axes equations back to $x$-$y$ form to identify the slope and intercept.
Updated On: Jul 31, 2025
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The Correct Option is D
Solution and Explanation
Let $u = y - x$ and $v = y + x$. The given graph is $u = m v$ with $m>0$. Substituting:
\[
y - x = m (y + x)
\]
\[
y - x = my + mx
\]
\[
y - my = x + mx
\]
\[
y(1 - m) = x(1 + m)
\]
\[
y = \frac{1 + m}{1 - m} x
\]
For $m>0$, if $m>1$, slope $\frac{1+m}{1-m}$ is negative, giving a downward sloping line through origin. The drawn graph slope>0 in $u-v$ space and intercepts at origin means $m>1$ is valid.
\[
\boxed{\text{Graph (4)}}
\]
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