NVAMediumJEE 2025Nature of Roots & Formation of Equations

JEE Mathematics 2025 Question with Solution

Let α,β\alpha, \beta be the roots of the equation x2axb=0x^2 - ax - b = 0 with Im(α)<Im(β)Im(\alpha) < Im(\beta). Let Pn=αnβnP_n = \alpha^n - \beta^n. If P3=57,P4=37,P5=117,P6=457P_3 = -5\sqrt{7}, \, P_4 = -3\sqrt{7}, \, P_5 = 11\sqrt{7}, \, P_6 = 45\sqrt{7}, then α4+β4|\alpha^4 + \beta^4| is equal to:

Answer

Correct answer:31

Step-by-step solution

Standard Method

Given: α,β\alpha, \beta are roots of x2axb=0x^2 - ax - b = 0 and Pn=αnβnP_n = \alpha^n - \beta^n.

Given values are:

  • P3=57P_3 = -5\sqrt{7}
  • P4=37P_4 = -3\sqrt{7}
  • P5=117P_5 = 11\sqrt{7}
  • P6=457P_6 = 45\sqrt{7}

Find: α4+β4|\alpha^4 + \beta^4|

Using properties of roots for x2axb=0x^2 - ax - b = 0:

  • α+β=a\alpha + \beta = a
  • αβ=b\alpha\beta = b

Also, the recurrence relation is

Pn=(α+β)Pn1αβPn2P_n = (\alpha + \beta)P_{n-1} - \alpha\beta P_{n-2}

so

Pn=aPn1bPn2P_n = aP_{n-1} - bP_{n-2}

From P5=aP4bP3P_5 = aP_4 - bP_3,

117=a(37)b(57)11\sqrt{7} = a(-3\sqrt{7}) - b(-5\sqrt{7}) 11=3a+5b11 = -3a + 5b

From P6=aP5bP4P_6 = aP_5 - bP_4,

457=a(117)b(37)45\sqrt{7} = a(11\sqrt{7}) - b(-3\sqrt{7}) 45=11a+3b45 = 11a + 3b

So we get the system

3a+5b=11-3a + 5b = 11 11a+3b=4511a + 3b = 45

Multiply the first equation by 33 and the second by 55:

9a+15b=33-9a + 15b = 33 55a+15b=22555a + 15b = 225

Subtracting gives

64a=19264a = 192 a=3a = 3

Substitute in 3a+5b=11-3a + 5b = 11:

3(3)+5b=11-3(3) + 5b = 11 9+5b=11-9 + 5b = 11 5b=205b = 20 b=4b = 4

Now,

α2+β2=(α+β)22αβ=a22b=3224=1\alpha^2 + \beta^2 = (\alpha + \beta)^2 - 2\alpha\beta = a^2 - 2b = 3^2 - 2\cdot 4 = 1

Then

α4+β4=(α2+β2)22(αβ)2\alpha^4 + \beta^4 = (\alpha^2 + \beta^2)^2 - 2(\alpha\beta)^2 α4+β4=12242=132=31\alpha^4 + \beta^4 = 1^2 - 2\cdot 4^2 = 1 - 32 = -31

Therefore,

α4+β4=31|\alpha^4 + \beta^4| = 31

So the required numerical value is 3131.

Using power-sum identity

Given: α,β\alpha, \beta are roots of x2axb=0x^2 - ax - b = 0 and Pn=αnβnP_n = \alpha^n - \beta^n.

Find: α4+β4|\alpha^4 + \beta^4|

For roots of the quadratic equation,

α+β=a,αβ=b\alpha + \beta = a, \qquad \alpha\beta = b

The sequence satisfies

Pn=(α+β)Pn1αβPn2P_n = (\alpha + \beta)P_{n-1} - \alpha\beta P_{n-2}

Using the given terms:

P5=aP4bP3P_5 = aP_4 - bP_3 117=a(37)b(57)11\sqrt{7} = a(-3\sqrt{7}) - b(-5\sqrt{7}) 11=3a+5b11 = -3a + 5b

Similarly,

P6=aP5bP4P_6 = aP_5 - bP_4 457=a(117)b(37)45\sqrt{7} = a(11\sqrt{7}) - b(-3\sqrt{7}) 45=11a+3b45 = 11a + 3b

Solve:

3a+5b=11-3a + 5b = 11 11a+3b=4511a + 3b = 45

After elimination,

a=3,b=4a = 3, \qquad b = 4

Now compute

α2+β2=(α+β)22αβ=98=1\alpha^2 + \beta^2 = (\alpha + \beta)^2 - 2\alpha\beta = 9 - 8 = 1

Hence,

α4+β4=(α2+β2)22α2β2\alpha^4 + \beta^4 = (\alpha^2 + \beta^2)^2 - 2\alpha^2\beta^2 α4+β4=122(4)2=31\alpha^4 + \beta^4 = 1^2 - 2(4)^2 = -31

Therefore, the required value is 3131.

Note: The alternative solution text on the page states αβ=b\alpha\beta = -b, which is inconsistent with the polynomial x2axb=0x^2 - ax - b = 0. The correct relation used above is αβ=b\alpha\beta = b, and it matches the final answer.

Common mistakes

  • Using the wrong product of roots. For x2axb=0x^2 - ax - b = 0, the product is αβ=b\alpha\beta = b, not b-b. Using b-b changes the recurrence and gives an incorrect value of α4+β4\alpha^4 + \beta^4.

  • Making an elimination error while solving 3a+5b=11-3a + 5b = 11 and 11a+3b=4511a + 3b = 45. The correct elimination gives a=3a = 3 and b=4b = 4. Check signs carefully when multiplying and subtracting equations.

  • Using the identity for α4+β4\alpha^4 + \beta^4 incorrectly. The correct formula is α4+β4=(α2+β2)22(αβ)2\alpha^4 + \beta^4 = (\alpha^2 + \beta^2)^2 - 2(\alpha\beta)^2. Omitting the factor 22 leads to the wrong final value.

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