JEE Mains · Maths · STD 12 - 7.2 definite integral
Let \(\mathrm{f}: \mathbf{R} \rightarrow \mathbf{R}\) be a twice differentiable function such that \(f(2)=1\). If \(\mathrm{F}(x)=x f(x)\) for all \(x \in \mathbf{R}\), \(\int_0^2 x \mathrm{~F}^{\prime}(x) \mathrm{d} x=6\) and \(\int_0^2 x^2 \mathrm{~F}^{\prime \prime}(x) \mathrm{d} x=40\), then \(\mathrm{F}^{\prime}(2)+\int_0^2 \mathrm{~F}(x) \mathrm{d} x\) is equal to :
- A \(11\)
- B \(13\)
- C \(15\)
- D \(9\)
Answer & Solution
Correct Answer
(A) \(11\)
Step-by-step Solution
Detailed explanation
\begin{aligned} & \int_0^2 \mathrm{xF}^{\prime}(\mathrm{x}) \mathrm{dx}=6 \\ & =\left.\mathrm{xF}(\mathrm{x})\right|_0 ^2-\int_0^2 \mathrm{f}(\mathrm{x}) \mathrm{dx}=6 \\ & =2 \mathrm{~F}(2)-\int_0^2 \mathrm{xF}(\mathrm{x}) \mathrm{dx}=6[\therefore \mathrm{f}(2)=2…
See the Complete Solution
Get step-by-step explanations for this and 2.5 Lakh+ more JEE, NEET & CET questions.
- Unlock all solutions
- Practice the full chapter
- Track accuracy across PYQs
4.8 rated on Google Play · 14,000+ reviews
More questions from Maths
- Let the tangent drawn to the parabola \(y ^{2}=24 x\) at the point \((\alpha, \beta)\) is perpendicular to the line \(2 x\) \(+2 y=5\). Then the normal to the hyperbola \(\frac{x^{2}}{\alpha^{2}}-\frac{y^{2}}{\beta^{2}}=1\) at the point \((\alpha+4, \beta+4)\) does \(NOT\) pass through the point.JEE Mains 2022 Medium
- Let \(f\) be any function defined on \(R\) and let it satisfy the condition \(|f( x )-f( y )| \leq\left|( x - y )^{2}\right|, \forall( x , y ) \in R\) If \(f(0)=1,\) thenJEE Mains 2021 Hard
- A bird is sitting on the top of a vertical pole \(20\, m\) high and its elevation from a point \(O\) on the ground is \(45^o \) . It flies off horizontally straight away from the point \(O\). After one second, the elevation of the bird from \(O\) is reduced to \(30^o \) . Then the speed (in \(m/s\)) of the bird isJEE Mains 2014 Hard
- Let \(y=y(x)\) be the solution of the differential equation \(x\frac{dy}{dx}-y=x^{2}\cot x, x\in(0,\pi)\). If \(y(\frac{\pi}{2})=\frac{\pi}{2}\), then \(6y(\frac{\pi}{6})-8y(\frac{\pi}{4})\) is equal to :JEE Mains 2026 Easy
- Let \(K\) be the sum of the coefficients of the odd powers of \(x\) in the expansion of \((1+ x )^{99}\). Let a be the middle term in the expansion of \(\left(2+\frac{1}{\sqrt{2}}\right)^{200}\). If \(\frac{{ }^{200} C _{99} K }{ a }=\frac{2^{\ell} m }{ n }\), where \(m\) and \(n\) are odd numbers, then the ordered pair \((l, n )\) is equal to :JEE Mains 2023 Hard
- The of value the integral \(\frac{48}{\pi^{4}} \int_{0}^{\pi}\left(\frac{3 \pi x ^{2}}{2}- x^{3}\right) \frac{\sin x }{1+\cos ^{2} x } dx\) is equal toJEE Mains 2022 Hard
More PYQs from JEE Mains
- If the sum of squares of all real values of \(\alpha\), for which the lines \(2 x-y+3=0,6 x+3 y+1=0\) and \(\alpha x+2 y-2=0\) do not form a triangle is \(p\), then the greatest integer less than or equal to \(\mathrm{p}\) is \(.........\)JEE Mains 2024 Medium
- Let the domain of the function
\(f(\mathrm{x})=\log _2 \log _4 \log _6\left(3+4 x-x^2\right)\) be \((\mathrm{a}, \mathrm{~b})\). If \(\int_0^{\mathrm{b}-\mathrm{a}}\left[\mathrm{x}^2\right] \mathrm{dx}=\mathrm{p}-\sqrt{\mathrm{q}}-\sqrt{\mathrm{r}}, \mathrm{p}, \mathrm{q},\) \(\mathrm{r} \in \mathbb{N}, \operatorname{gcd}(\mathrm{p}, \mathrm{q}, \mathrm{r})=1,\)
where [\(\cdot]\) is the greatest integer function, then \(\mathrm{p}+\mathrm{q}+\mathrm{r}\) is equal toJEE Mains 2025 Hard - Let \( (2\alpha, \alpha) \) be the largest interval in which the function \( f(t)=\frac{|t+1|}{t^{2}}, t<0 \), is strictly decreasing. Then the local maximum value of the function \( g(x)=2\log_{e}(x-2)+\alpha x^{2}+4x-\alpha, x>2 \), isJEE Mains 2026 Medium
- \(\lim\limits _{x \rightarrow 0} \frac{\cos (\sin x)-\cos x}{x^{4}}\) is equal to :JEE Mains 2022 Hard
- If \(S\) is the sum of the first \(10\) terms of the series \(\tan ^{-1}\left(\frac{1}{3}\right)+\tan ^{-1}\left(\frac{1}{7}\right)+\tan ^{-1}\left(\frac{1}{13}\right)+\tan ^{-1}\left(\frac{1}{21}\right)+\ldots\) then \(\tan ( S )\) is equal toJEE Mains 2020 Medium
- The remainder when \((2021)^{2023}\) is divided by \(7\) isJEE Mains 2022 Hard