Download App

Maths 1 Marks Question

PART - 1 CH - 2 Relations and Functions · CBSE STD 11 Science (CBSE - English Medium). 8 questions.

Questions

1 Marks Question

🎯

Test yourself on this topic

8 questions · timed · auto-graded

Question 11 Mark
If $f(x)=\tan x$ then write the value of $f(x)+f(\pi-x)$.
Answer

$\begin{array}{l}f(x)=\tan x, f(\pi-x)=\tan (\pi-x)=-\tan x \\ \therefore f(x)+f(\pi-x)=\tan x-\tan x=0\end{array}$
View full question & answer
Question 21 Mark
If $A =\{2,3,5,7\}$ and $f: A \rightarrow N , f(x)=x^3+2$, then find the range of function.
Answer

$\begin{array}{l}f(2)=2^3+2=8+2=10 \\f(3)=3^3+2=27+2=29 \\f(5)=5^3+2=125+2=127 \\f(7)=7^3+2=343+2=345\end{array}$
Hence, range of function $=\{10,29,127,345\}$
View full question & answer
Question 31 Mark
A relation R is defined on set N such that $R =\{(x, y)$ / $y=x+2,1 < x < 5\}$ then write the domain of relation R.
Answer
Domain $=\{2,3,4\}$.
View full question & answer
Question 41 Mark
If $f(x)=\frac{x}{x+1}$, then write the value of $f\left(\frac{p}{q}\right)$.
Answer
$f\left(\frac{p}{q}\right)=\frac{p / q}{\frac{p}{q}+1}=\frac{p / q}{\frac{p+q}{q}}=\frac{p}{p+q}$
View full question & answer
Question 51 Mark
If $f(x)=\log x$, then find the value of $f(e)$.
Answer

$\begin{array}{l}f(x)=\log _{ e } x \\ \therefore f(e)=\log _{ e } e=1\end{array}$
View full question & answer
Question 61 Mark
$A$ and $B$ are two different sets, each of which has two elements. Find the number of non-empty relation from set A to set B .
Answer
Let $A =\{a, b\}$ and $B =\{x, y\}$
$n(A)=2, n(B)=2$
then, $n(A \times B )=2 \times 2=4$
So, the required number of non empty relations from A to $B=2^4-1=15$
View full question & answer
Question 71 Mark
If A is a set of first five natural numbers and a relation R is defined on A such that $x R y \Leftrightarrow x < y$, then write the domain of R .
Answer
$\{1,2,3,4\}$
View full question & answer
Question 81 Mark
A relation $R$ is defined on a set $A=\{1,2,3,4,5,6\}$ such that $x R y \Leftrightarrow x+2 y=8$, then write the domain of R.
Answer

$\begin{array}{l}\text { Given, } \quad x+2 y=8 \\\therefore \quad 2 y=8-x \\\Rightarrow \quad y=\frac{8-x}{2} \\2 \text { R 3, } 4 \text { R 2, } 6 \text { R } 1 \\\therefore \text { Domain of } R=\{2,4,6\}\end{array}$
View full question & answer
Generate Paper FreeAll PART - 1 CH - 2 Relations and Functions topics
1 Marks Question - Maths STD 11 Science Questions - Vidyadip