NVAMediumJEE 2026Geometric Progression (GP)

JEE Mathematics 2026 Question with Solution

In a G.P., if the product of the first three terms is 2727 and the set of all possible values for the sum of its first three terms is R(a,b)\mathbb{R} - (a,b), then a2+b2a^2+b^2 is equal to:

Answer

Correct answer:90

Step-by-step solution

Standard Method

Given: The product of the first three terms of a G.P. is 2727.

Find: The value of a2+b2a^2+b^2 if the set of all possible sums of the first three terms is R(a,b)\mathbb{R}-(a,b).

Let the first three terms of the geometric progression be

ar, a, ar\frac{a}{r},\ a,\ ar

where a0a \neq 0 and r0r \neq 0.

Using the given product condition,

araar=a3=27\frac{a}{r}\cdot a \cdot ar = a^3 = 27

So,

a=3a = 3

Now the sum of the first three terms is

S=3r+3+3rS = \frac{3}{r} + 3 + 3r

Thus,

S=3(r+1r+1)S = 3\left(r + \frac{1}{r} + 1\right)

For all real r0r \neq 0,

r+1r2orr+1r2r + \frac{1}{r} \ge 2 \quad \text{or} \quad r + \frac{1}{r} \le -2

Therefore,

S3(2+1)=9S \ge 3(2+1) = 9

or

S3(2+1)=3S \le 3(-2+1) = -3

Hence, the set of all possible values of SS is

(,3][9,)(-\infty,-3] \cup [9,\infty)

So,

R(a,b)=R(3,9)\mathbb{R}-(a,b) = \mathbb{R}-(-3,9)

which gives

a=3,b=9a = -3, \quad b = 9

Now,

a2+b2=(3)2+92=9+81=90a^2+b^2 = (-3)^2 + 9^2 = 9 + 81 = 90

Therefore, the required value is 9090.](streamdown:incomplete-link)

Range-Based Interpretation

Given: The first three terms form a G.P. and their product is 2727.

Find: The endpoints aa and bb of the excluded interval, then compute a2+b2a^2+b^2.

Write the three terms as

ar, a, ar\frac{a}{r},\ a,\ ar

Their product is

araar=a3\frac{a}{r}\cdot a \cdot ar = a^3

Since this equals 2727,

a3=27a=3a^3 = 27 \Rightarrow a = 3

So the sum becomes

S=3r+3+3r=3(r+1r+1)S = \frac{3}{r}+3+3r = 3\left(r+\frac{1}{r}+1\right)

Now use the standard range result for real nonzero rr:

r+1r(,2][2,)r+\frac{1}{r} \in (-\infty,-2] \cup [2,\infty)

Adding 11 gives

r+1r+1(,1][3,)r+\frac{1}{r}+1 \in (-\infty,-1] \cup [3,\infty)

Multiplying by 33 gives

S(,3][9,)S \in (-\infty,-3] \cup [9,\infty)

Thus the missing open interval is

(a,b)=(3,9)(a,b)=(-3,9)

Therefore,

a2+b2=(3)2+92=90a^2+b^2 = (-3)^2 + 9^2 = 90

Therefore, the required numerical answer is 9090.](streamdown:incomplete-link)

Common mistakes

  • Taking the first three terms as a,ar,ar2a, ar, ar^2 and then directly using the same middle term symbol aa from the interval expression can create notation confusion. This is not wrong by itself, but mixing symbols may lead to incorrect identification of the interval endpoints. Use a separate common term symbol and keep the interval endpoints a,ba,b distinct.

  • Using only r+1r2r+\frac{1}{r} \ge 2 and forgetting the branch r+1r2r+\frac{1}{r} \le -2 for negative rr gives an incomplete range. This misses all sums less than or equal to 3-3. Always use both branches for real nonzero rr.

  • Writing R(a,b)\mathbb{R}-(a,b) as if it means only values inside the interval is incorrect. It means all real numbers except the open interval (a,b)(a,b). So if the attainable set is (,3][9,)(-\infty,-3] \cup [9,\infty), then the excluded interval is (3,9)(-3,9).](streamdown:incomplete-link)

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