Prove that: cos³x + cos³(2π/3 + x) + cos³(4π/3 + x) = 3(cos3x)/4
✔️ Step - by - step Solution
❎ Plagiarism and Spams
Answers
ello,
i) As 4π/3 = π + π/3 and 2π/3 = π - π/3,
as well cos(π + t) = cos(π - t) = -cos(t),
cos(x + 4π/3) = -cos(π/3 + x) and cos(x + 2π/3) = -cos(π/3 - x)
ii) So of the above, cos³(x + 2π/3) + cos³(x + 4π/3) = -{cos³(π/3 + x) + cos³(π/3 - x)}
Applying the identity, a³ + b³ = (a + b)³ - 3ab(a + b),
-{cos³(π/3 + x) + cos³(π/3 - x)} =
= -[{cos(π/3 + x) + cos(π/3 - x)}³ -3cos(π/3 + x)*cos(π/3 - x){cos(π/3 + x) + cos(π/3 - x)}]
= -[{2cos(π/3)*cos(x)}³ - 3{cos²x - sin²(π/3)}{2cos(π/3)*cos(x)}]
[Application: cos(A + B) + cos(A- B) = 2cos(A)*cos(B); cos(A + B)*cos(A - B) = cos²A - sin²B]
= -[cos³x - 3(cos²x - 3/4)*cos(x)] = -[cos³x - 3cos³x + (9/4)*cos(x)]
= 2cos³x - (9/4)*cos(x)
iii) So of the above left side = cos³x + 2cos³x - (9/4)*cos(x) = 3cos³x - (9/4)*cos(x)
= (3/4){4cos³x - 3*cos(x)} [Identity: 4cos³x - 3*cos(x) = cos(3x)]
= (3/4)*cos(3x) [Proved]
EDIT:
Just now I could solve the same in another method, which I feel simpler than this one.
i) As explained we have,
cos³x + cos³(x + 2π/3) + cos³(x + 4π/3) = cos³x - cos³(π/3 - x) - cos³(π/3 + x)
ii) cos(3A) = 4cos³A - 3cos(A)
==> cos³A = (1/4){cos(3A) + 3cos(A)}
Applying this,
cos³x = (1/4){cos(3x) + 3cos(x)}
-cos³(π/3 - x) = -(1/4){cos(π - 3x) + 3cos(π/3 - x)} = (1/4){cos(3x) - 3cos(π/3 - x)}
-cos³(π/3 + x) = -(1/4){cos(π + 3x) + 3cos(π/3 + x)} = (1/4){cos(3x) - 3cos(π/3 + x)}
Adding all the above,
Left side = (1/4)[3cos(3x) + 3cos(x) - 3{cos(π/3 + x) + cos(π/3 - x)}]
= (1/4)[3cos(3x) + 3cos(x) - 3{2cos((π/3)*cos(x)]
= (1/4)[3cos(3x) + 3cos(x) - 3cos(x)]
= (3/4)*cos(3x) [Proved]
hope it helps you dear ❣️
brainlist please ❣️
Answer:
Note that cos³x
= cos x (1 - sin²x)
= cos x (1 - (1/2)(1 - cos(2x))), via half angle identity
= cos x * (1/2)(2 - (1 - cos(2x)))
= (1/2) [cos x + cos(2x) cos x]
= (1/2) [cos x + (1/2) (cos(2x + x) + cos(2x - x))]
= (1/4) [2 cos x + (cos(3x) + cos x)]
= (1/4) (3 cos x + cos(3x)).
---------
So, cos³x + cos³(x + 2π/3) + cos³(x + 4π/3)
= (1/4) (3 cos x + cos(3x)) + (1/4) (3 cos(x + 2π/3) + cos(3(x + 2π/3))) + (1/4) (3 cos(x + 4π/3) + cos(3(x + 4π/3)))
= (1/4) [(3 cos x + cos(3x)) + (3 cos(x + 2π/3) + cos(3x + 2π)) +
(3 cos(x + 4π/3) + cos(3x + 4π))]
= (1/4) [3 cos x + cos(3x) + 3 cos(x + 2π/3) + cos(3x) +
3 cos(x + 4π/3) + cos(3x)], due to periodicity of cosine
= (3/4) [cos(3x) + cos x + cos(x + 2π/3) + cos(x + 4π/3)]
= (3/4) [cos(3x) + cos x + (cos x cos(2π/3) - sin x sin(2π/3))
+ (cos x cos(4π/3) - sin x sin(4π/3))], via sum of angles
= (3/4) [cos(3x) + cos x + (-1/2) cos x - (√3/2) sin x + (-1/2) cos x - (-√3/2) sin x]
= (3/4) cos(3x).
-------
I hope this helps!
Step-by-step explanation:
MAKE ME AS BRAINLY STARS PLEASE