Question
Mathematics Question on Quadratic Equations
The quadratic equation whose roots are sin218° and cos2 36° is
16x2 - 12x - 1 = 0
16x2 - 12x + 4 = 0
16x2 - 12x + 1 = 0
16x2 + 12x + 1 = 0
16x2 - 12x + 1 = 0
Solution
The correct option is: (C) 16x2 - 12x + 1 = 0.
(A) The sum of the roots can be expressed as the combination of trigonometric values:
sin2(18∘)+cos2(36∘)=(45−15)2+(45+15)2sin2(18∘)+cos2(36∘)=(54−51)2+(54+51)2
=1625+1625=3225=2516+2516=2532
=1625[(5+1)2+(5−1)2]=2516[(5+1)2+(5−1)2]
=1625⋅2⋅(5+1)=2516⋅2⋅(5+1)
=3225⋅6=2532⋅6
=19225=25192
Hence, the sum of the roots is 1922525192.
The product of the roots can be expressed similarly:
sin2(18∘)⋅cos2(36∘)=(45−15)2⋅(45+15)2sin2(18∘)⋅cos2(36∘)=(54−51)2⋅(54+51)2
=1625⋅1625=256625=2516⋅2516=625256
Therefore, the quadratic equation can be written as:
cos2(36∘))x 2−(sin2(18∘)+cos2(36∘))x +(sin2(18∘)⋅cos2(36∘))
625 x 2−25192 x +625256
Finally, we can multiply the entire equation by 2525 to get rid of the fractions:
2525 x 2−192 x +25256
Multiplying by 2525 gives:
16 x 2−192 x +256=0(A) The sum of the roots can be expressed as the combination of trigonometric values:
sin2(18∘)+cos2(36∘)=(45−15)2+(45+15)2sin2(18∘)+cos2(36∘)=(54−51)2+(54+51)2
=1625+1625=3225=2516+2516=2532
=1625[(5+1)2+(5−1)2]=2516[(5+1)2+(5−1)2]
=1625⋅2⋅(5+1)=2516⋅2⋅(5+1)
=3225⋅6=2532⋅6
=19225=25192
Hence, the sum of the roots is 1922525192.
The product of the roots can be expressed similarly:
sin2(18∘)⋅cos2(36∘)=(45−15)2⋅(45+15)2sin2(18∘)⋅cos2(36∘)=(54−51)2⋅(54+51)2
=1625⋅1625=256625=2516⋅2516=625256
Therefore, the quadratic equation can be written as:
(sin2(18∘)+cos2(36∘))x +(sin2(18∘)⋅cos2(36∘))
625 x 2−25192 x +625256
Finally, we can multiply the entire equation by 2525 to get rid of the fractions:
2525 x 2−192 x +25256
Multiplying by 2525 gives:
16 x 2−192 x +256=0