Question:
Let $f(\alpha)$ denote the area of the region in the first quadrant bounded by
$x=0$, $x=1$, $y^2=x$ and $y=|\alpha x-5|-|1-\alpha x|+\alpha^2$.
Then $(f(0)+f(1))$ is equal to
Let $f(\alpha)$ denote the area of the region in the first quadrant bounded by
$x=0$, $x=1$, $y^2=x$ and $y=|\alpha x-5|-|1-\alpha x|+\alpha^2$.
Then $(f(0)+f(1))$ is equal to
Show Hint
When absolute values are involved, always simplify the expression interval-wise before integrating.
Updated On: Feb 5, 2026
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The Correct Option is C
Solution and Explanation
Step 1: Evaluate $f(0)$.
For $\alpha=0$, \[ y=| -5|-|1|=5-1=4 \] Area between $y=4$ and $y^2=x$ from $x=0$ to $x=1$: \[ f(0)=\int_{0}^{1}(4-\sqrt{x})\,dx \] \[ =4-\frac{2}{3}= \frac{10}{3} \] Step 2: Evaluate $f(1)$.
For $\alpha=1$, \[ y=|x-5|-|1-x|+1 \] In $[0,1]$, this simplifies to \[ y=(5-x)-(1-x)+1=5 \] Area becomes \[ f(1)=\int_{0}^{1}(5-\sqrt{x})\,dx \] \[ =5-\frac{2}{3}=\frac{13}{3} \] Step 3: Add the areas.
\[ f(0)+f(1)=\frac{10}{3}+\frac{13}{3}=7 \]
For $\alpha=0$, \[ y=| -5|-|1|=5-1=4 \] Area between $y=4$ and $y^2=x$ from $x=0$ to $x=1$: \[ f(0)=\int_{0}^{1}(4-\sqrt{x})\,dx \] \[ =4-\frac{2}{3}= \frac{10}{3} \] Step 2: Evaluate $f(1)$.
For $\alpha=1$, \[ y=|x-5|-|1-x|+1 \] In $[0,1]$, this simplifies to \[ y=(5-x)-(1-x)+1=5 \] Area becomes \[ f(1)=\int_{0}^{1}(5-\sqrt{x})\,dx \] \[ =5-\frac{2}{3}=\frac{13}{3} \] Step 3: Add the areas.
\[ f(0)+f(1)=\frac{10}{3}+\frac{13}{3}=7 \]
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