The equation x² - x - 2 = 0 in three-dimensional space is represe… - Vidyadip

Question

The equation x² - x - 2 = 0 in three-dimensional space is represented by:

✓

Answer

A pair of parallel planes

Need a full question paper?

Generate a complete, print-ready paper with questions like this in minutes — across 16+ boards, with answer keys.

Start Generating Free

Explore more

More "M.C.Q (1 Marks)" from Three Dimensional Geometry→Three Dimensional Geometry — all question types→MATHS STD 12 Science question papers→Rajasthan Board STD 12 Science question papers→Rajasthan Board question paper generator→

Similar questions

The derivative of $\sec^{-1}\Big(\frac{1}{2\text{x}^2+1}\Big)$ w.r.t. $\sqrt{1+3\text{x}}$ at $\text{x}=\frac{-1}{3}$

$\text{Does not exist.}$
$0$
$\frac{1}{2}$
$\frac{1}{3}$

Using fundamental theorem of calculus, which of following integrals can be solved.
(i) $\int_0^1 x^3 d x$
(ii) $\int x e^x d x$
(iii) $\int_2^3 \frac{1}{x} d x$

Given that the fuel cost per hour is $k$ times the square of the speed the train generates in $km / h$, the value of $k$ is

(2, -3, -1) 2x - 3y + 6z + 7 = 0:

4
3
2
$\frac{1}{5}$

If the three points A(1, 6), B(3, −4) and C(x, y) are collinear, then the equation satisfying by x and y is:

$S$ is a relation over the set $R$ of all real numbers and it is given by $(\text{a, b})\in\text{S}\Leftrightarrow\text{ab}\geq0.$ Then, $S$ is:

If $\text{xy}-\log_\text{e}\text{y}=1$ satisfies the equation $\text{x}(\text{yy}_2+\text{y}_1^2)-\text{y}_2+\lambda\text{yy}_1=0,$ then $\lambda=$

-3
1
3
None of these

The area of the region $\{(\text{x},\text{y}):\text{y}^2\leq4\text{x},4\text{x}^2+4\text{y}^2\leq9\}$ is:

$\frac{\sqrt2}{6}+\frac{9\pi}{8}-\frac{9}{4}\sin-1(\frac{1}{5})$
$\frac{\sqrt2}{6}-\frac{9\pi}{8}$
$\frac{9\pi}{8}-\frac{9}{4}\sin-1(\frac{1}{3})$
$\text{None of these}$

If $\text{y}^2=\text{ax}^2+\text{bx}+\text{c},$ then $\text{y}^3\frac{\text{d}^2\text{y}}{\text{dx}^2}$ is:

a constant
a function of x only
a function of y only
a function of x and only

If $\text{A}=\frac{1}{\pi}\begin{bmatrix}\sin^{-1}(\pi\text{x})&\tan^{-1}(\frac{\text{x}}{\pi})\\\sin^{-1}(\frac{\text{x}}{\pi})&\cot^{-1}(\pi\text{x})\end{bmatrix},$ $\text{B}=\frac{1}{\pi}\begin{bmatrix}-\cos^{-1}(\pi\text{x})&\tan^{-1}(\frac{\text{x}}{\pi})\\\sin^{-1}(\frac{\text{x}}{\pi})&-\tan^{-1}(\pi\text{x})\end{bmatrix},$ then A - B is equal to:

I
0
2I
$\frac{1}{2}\text{I}$