The common difference of the A.P.: $3,\,3+\sqrt{2},\,3+2\sqrt{2},\,3+3\sqrt{2},\,\ldots$ will be:
The common difference of the A.P.: $3,\,3+\sqrt{2},\,3+2\sqrt{2},\,3+3\sqrt{2},\,\ldots$ will be:
Show Hint
- $1+\sqrt{2}$
- $3(1+\sqrt{2})$
- $2\sqrt{2}$
- $\sqrt{2}$
The Correct Option is D
Solution and Explanation
Step 1: Recall definition of common difference
In an arithmetic progression (A.P.), the common difference $d$ is given by:
\[
d = a_{n+1} - a_n
\]
Step 2: Take consecutive terms
First term = $3$, second term = $3+\sqrt{2}$.
\[
d = (3+\sqrt{2}) - 3 = \sqrt{2}
\]
Step 3: Verify with next terms
Third term = $3+2\sqrt{2}$. Difference from second term:
\[
(3+2\sqrt{2}) - (3+\sqrt{2}) = \sqrt{2}
\]
This matches. Hence $d = \sqrt{2}$.
\[
\boxed{d = \sqrt{2}}
\]
Top Questions on nth Term of an AP
- What is the sum of the infinite series \( S = \sum_{n=0}^{\infty} \frac{1}{3^n} \)?
- JEE Main - 2025
- Mathematics
- nth Term of an AP
- 25th term of an A.P. 6, 10, 14, ... will be:
- UP Board X - 2025
- Mathematics
- nth Term of an AP
Let $a_1, a_2, a_3, \ldots$ be an AP If $a_7=3$, the product $a_1 a_4$ is minimum and the sum of its first $n$ terms is zero, then $n !-4 a_{n(n+2)}$ is equal to :
- JEE Main - 2023
- Mathematics
- nth Term of an AP
- Let \(a,b,c>1,a^3,b^3 \text{ and } c^3\) be in A.P., and \(log_ab, log_ca \text{ and } log_bc\) be in G.P. If the sum of first 20 terms of an A.P., whose first term is \(\frac{a+4b+c}{3}\) and the common difference is \(\frac{a−8b+c}{10}\) is −444, then abc is equal to:
- JEE Main - 2023
- Mathematics
- nth Term of an AP
Let $a_1, a_2, \ldots, a_n$ be in AP If $a_5=2 a_7$ and $a_{11}=18$, then $12\left(\frac{1}{\sqrt{a_{10}}+\sqrt{a_{11}}}+\frac{1}{\sqrt{a_{11}}+\sqrt{a_{12}}}+\ldots+\frac{1}{\sqrt{a_{17}}+\sqrt{a_{18}}}\right)$ is equal to
- JEE Main - 2023
- Mathematics
- nth Term of an AP
Questions Asked in UP Board X exam
- (ii) Show ray diagram for the refraction of a light ray through a prism and point out the emergent angle and angle of deviation.
- UP Board X - 2025
- Refraction Through A Prism
- (i) Show the image formation by a convex mirror by ray diagram when the object is at infinity and
(a) at infinity
(b) in between pole of the mirror and infinity- UP Board X - 2025
- Ray Diagram
- Prove that \(\displaystyle \frac{\sin A-\cos A+1}{\sin A+\cos A-1}=\frac{1}{\sec A-\tan A}\).
- UP Board X - 2025
- Trigonometric Identities
$PQ$ is a chord of length $4\ \text{cm}$ of a circle of radius $2.5\ \text{cm}$. The tangents at $P$ and $Q$ intersect at a point $T$. Find the length of $TP$.
- UP Board X - 2025
- Tangent to a Circle
- If point $Q(0,1)$ is equidistant from points $P(5,-3)$ and $R(x,6)$, find the values of $x$.
- UP Board X - 2025
- Distance Formula