prove that sin ^4 theta -cos^4 theta =1-2cos^2thet
Answers
To prove :
sin⁴ theta - cos⁴ theta = 1 - 2 cos² theta
Solution :
LHS -
sin⁴ theta - cos⁴ theta
=> [ sin² theta ] ² - [ cos² theta ] ²
We know that , a² - b³ can be written as (a + b)( a - b)
Utilising that identity here ;
=> [ sin² theta + cos ² theta ][ sin² theta - cos² theta]
Now , sin² theta + cos ² theta = 1
=> [ 1 ] [ sin² theta - cos ² theta ]
sin² theta + cos ² theta = 1
=> sin² theta = 1 - cos² theta
=> ( 1 - cos² theta ) - cos² theta
=> [ 1 - 2 cos ² theta ]
So ,
sin⁴ theta - cos⁴ theta = 1 - 2sin² theta = 1 - 2 cos² theta
Hence Proved
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Step-by-step explanation:
Ohm's Law is a formula used to calculate the relationship between voltage, current and resistance in an electrical circuit. To students of electronics, Ohm's Law (E = IR) is as fundamentally important as Einstein's Relativity equation (E = mc²) is to physicists. E = I x R