NVAMediumJEE 2023Composition & Inverse Functions

JEE Mathematics 2023 Question with Solution

Let for xRx \in \mathbb{R} f(x)=x+x2forx0andf(x)=x2forx<0f(x) = \frac{x + |x|}{2} \quad \text{for} \quad x \geq 0 \quad \text{and} \quad f(x) = \frac{x}{2} \quad \text{for} \quad x < 0 g(x)={x2forx0,xforx<0g(x) = \begin{cases} x^2 & \text{for} \quad x \geq 0,\\ x & \text{for} \quad x < 0 \end{cases} Then the area bounded by the curve y=fg(x)y = f \circ g(x) and the lines y=0,2yx=15y = 0, 2y - x = 15 is equal to:

Answer

Correct answer:72

Step-by-step solution

Standard Method

Given: f(x)=x+x2f(x) = \frac{x + |x|}{2} for x0x \geq 0 and f(x)=x2f(x) = \frac{x}{2} for x<0x < 0; g(x)=x2g(x) = x^2 for x0x \geq 0 and g(x)=xg(x) = x for x<0x < 0.

Find: The area bounded by y=fg(x)y = f \circ g(x), y=0y = 0 and 2yx=152y - x = 15.

Working image showing piecewise definitions of f(x), g(x), composition f o g, and the line 2y minus x equals 15.

From the composition shown in the solution,

fg(x)=f[g(x)]={g(x),g(x)00,g(x)<0f \circ g(x) = f[g(x)] = \begin{cases} g(x), & g(x) \geq 0 \\ 0, & g(x) < 0 \end{cases}

Hence,

fg(x)={x2,x00,x<0f \circ g(x) = \begin{cases} x^2, & x \geq 0 \\ 0, & x < 0 \end{cases}

The line is

2yx=152y - x = 15

so

y=x+152y = \frac{x+15}{2}

The curve y=x2y = x^2 intersects this line at x=3x = 3 as indicated in the solution figure.

Therefore the required area is taken as

A=03(x+152x2)dx+12×15×152A = \int_0^3 \left( \frac{x+15}{2} - x^2 \right) dx + \frac{1}{2} \times 15 \times \frac{15}{2}

Now evaluate:

A=[x24+15x2x33]03+2254A = \left[ \frac{x^2}{4} + \frac{15x}{2} - \frac{x^3}{3} \right]_0^3 + \frac{225}{4}

Substituting the limits,

A=94+4529+2254A = \frac{9}{4} + \frac{45}{2} - 9 + \frac{225}{4} A=9+9036+2254=2884=72A = \frac{9 + 90 - 36 + 225}{4} = \frac{288}{4} = 72

Therefore, the required area is 7272.

Graph showing the line crossing points negative fifteen comma zero and zero comma fifteen by two, and the curve meeting at three comma nine with shaded bounded region.

Using the plotted region

Stepwise solution image deriving f o g as x squared for x nonnegative and zero for x negative, then setting up the area integral.Coordinate graph of the shaded bounded region between the line, x axis, and parabola with marked points minus fifteen zero, zero fifteen by two, and three nine.

The plotted region confirms that for x<0x < 0, the graph of y=fg(x)y = f \circ g(x) lies on y=0y = 0, while for x0x \geq 0 it becomes y=x2y = x^2. The line y=x+152y = \frac{x+15}{2} forms a triangle with the xx-axis on the left and a curvilinear part with the parabola on the right. Adding these two parts gives the total area as 7272.

Common mistakes

  • Using f(x)=xf(x)=x for x0x \geq 0 but forgetting that the composition is f(g(x))f(g(x)), not f(x)g(x)f(x)g(x). First determine the sign of g(x)g(x) and then apply the correct branch of ff.

  • Taking fg(x)=x2f \circ g(x)=x^2 for all real xx. For x<0x<0, g(x)=x<0g(x)=x<0, so the relevant branch of ff gives f(g(x))=0f(g(x))=0, not x2x^2.

  • Finding the region only from 03(x+152x2)dx\int_0^3 \left(\frac{x+15}{2}-x^2\right)dx and missing the triangular area to the left of the yy-axis. The bounded region also includes the part between the line and y=0y=0 from x=15x=-15 to x=0x=0.

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