JEE Mains · Maths · STD 12 - 10. vector algebra
If \(\overrightarrow{ a }=\hat{ i }+2 \hat{ k }, \overrightarrow{ b }=\hat{ i }+\hat{ j }+\hat{ k }, \overrightarrow{ c }=7 \hat{ i }-3 \hat{ k }+4 \hat{ k }\) \(\overrightarrow{ r } \times \overrightarrow{ b }+\overrightarrow{ b } \times \overrightarrow{ c }=\overrightarrow{0}\) and \(\overrightarrow{ r } \cdot \overrightarrow{ a }=0\) then \(\overrightarrow{ r } \cdot \overrightarrow{ c }\) is equal to :
- A \(34\)
- B \(12\)
- C \(36\)
- D \(30\)
Answer & Solution
Correct Answer
(A) \(34\)
Step-by-step Solution
Detailed explanation
\(\overrightarrow{ r } \times \overrightarrow{ b }-\overrightarrow{ c } \times \overrightarrow{ b }=0\) \(\Rightarrow(\overrightarrow{ r }-\overrightarrow{ c }) \times \overrightarrow{ b }=0\) \(\Rightarrow \overrightarrow{ r }-\overrightarrow{ c }=\lambda \overrightarrow{ b }\)…
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 \(\omega \) be a complex number such that \(2\omega + 1 = z\) where \(z = \sqrt { - 3} \) . If \(\left| {\begin{array}{*{20}{c}}1&1&1\\1&{ - {\omega ^2} - 1}&{{\omega ^2}}\\1&{{\omega ^2}}&{{\omega ^7}}\end{array}} \right| = 3k\) then \(k\) is equal to :JEE Mains 2017 Hard
- A \(10\, inches\) long pencil \(\mathrm{AB}\) with mid point \(\mathrm{C}\) and a small eraser \(\mathrm{P}\) are placed on the horizontal top of a table such that \(\mathrm{PC}=\sqrt{5}\) inches and \(\angle \mathrm{PCB}=\tan ^{-1}(2)\). The acute angle through which the pencil must be rotated about \(\mathrm{C}\) so that the perpendicular distance between eraser and pencil becomes exactly \(1\, inch\) is:
JEE Mains 2021 Hard - If the area of the region \(\left\{(\mathrm{x}, \mathrm{y}): \frac{\mathrm{a}}{\mathrm{x}^2} \leq \mathrm{y} \leq \frac{1}{\mathrm{x}}, 1 \leq \mathrm{x} \leq 2,0<\mathrm{a}<1\right\}\) is \(\left(\log _e 2\right)-\frac{1}{7}\) then the value of \(7 a-3\) is equal to :JEE Mains 2024 Hard
- If \([x]\) denotes the greatest integer less than or equal to \(x\), then the value of the integral \(\int_{-\pi / 2}^{\pi / 2}[[x]-\sin x] d x\) is equal to:JEE Mains 2021 Hard
- Let \(X\) be a binomially distributed random variable with mean \(4\) and variance \(\frac{4}{3}\). Then \(54 P ( X \leq 2)\) is equal to.JEE Mains 2022 Medium
- Let \(\mathrm{f}: \mathbb{R} \rightarrow \mathbb{R}\) be a function defined by \(f(x)=\frac{4^x}{4^x+2}\) and \(M=\int_{f(a)}^{f(1-a)} x \sin ^4(x(1-x)) d x,\) \(N=\int_{f(a)}^{f(1-a)} \sin ^4(x(1-x)) d x ; a \neq \frac{1}{2} . \text { If }\) \(\alpha \mathrm{M}=\beta \mathrm{N}, \alpha, \beta \in \mathbb{N}\), then the least value of \(\alpha^2+\beta^2\) is equal to ...........JEE Mains 2024 Hard
More PYQs from JEE Mains
- The area of the region given by \(A=\left\{(x, y): x^{2} \leq y \leq \min \{x+2,4-3 x\}\right\}\) is.JEE Mains 2022 Hard
- For an initial screening of an admission test, a candidate is given fifty problems to solve. If the probability that the candidate can solve any problem is \(\frac{4}{5}\) , then the probability that he is unable to solve less than two problems isJEE Mains 2019 Hard
- Two dice are thrown \(5\) times, and each time the sum of the numbers obtained being \(5\) is considered a success. If the probability of having at least \(4\) successes is \(\frac{\mathrm{k}}{3^{11}}\), then \(\mathrm{k}\) is equal toJEE Mains 2023 Hard
- Let a differentiable function \(f\) satisfy \(f ( x )+\int \limits_3^{ x } \frac{ f ( t )}{ t } dt =\sqrt{ x +1}, x \geq 3\). Then \(12 f (8)\) is equal to:JEE Mains 2023 Hard
- Choose the correct statement about two circles whose equations are given below \(x^{2}+y^{2}-10 x-10 y+41=0\) \(x^{2}+y^{2}-22 x-10 y+137=0\)JEE Mains 2021 Medium
- If the equation \(\cos ^{4} \theta+\sin ^{4} \theta+\lambda=0\) has real solutions for \(\theta,\) then \(\lambda\) lies in the intervalJEE Mains 2020 Hard