Question 11 Mark
State whether statement are True or False.
If the sum of $n$ terms of a sequence is quadratic expression, then it always represents an A.P.
If the sum of $n$ terms of a sequence is quadratic expression, then it always represents an A.P.
Answer
View full question & answer→False.
Solution:
We know that the sum of n terms of A.P. is
$\text{S}_\text{n}=\frac{\text{n}}{2}(2\text{a}+(\text{n}-1)\text{d})=\frac{\text{n}}{2}(2\text{a}-\text{d}+\text{nd})$
$=\Big(\frac{2\text{a}-\text{d}}{2}\Big)\text{n}+\Big(\frac{\text{d}}{2}\Big)\text{n}^2$
Thus, $S_n $ is of type $An^2 + Bn.$
But general quadratic expression is of the form $An^2 + Bn + C.$
Thus, if the sum of $n$ terms of a sequence is quadratic expression of type $An^2 + Bn + C,$
where $\text{C}\neq0,$ it does not represents sum of A.P.
Solution:
We know that the sum of n terms of A.P. is
$\text{S}_\text{n}=\frac{\text{n}}{2}(2\text{a}+(\text{n}-1)\text{d})=\frac{\text{n}}{2}(2\text{a}-\text{d}+\text{nd})$
$=\Big(\frac{2\text{a}-\text{d}}{2}\Big)\text{n}+\Big(\frac{\text{d}}{2}\Big)\text{n}^2$
Thus, $S_n $ is of type $An^2 + Bn.$
But general quadratic expression is of the form $An^2 + Bn + C.$
Thus, if the sum of $n$ terms of a sequence is quadratic expression of type $An^2 + Bn + C,$
where $\text{C}\neq0,$ it does not represents sum of A.P.