Formula of general solution of trigonometric equations
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These are the formula with their conclusions
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the answer of the question is the formula to find the general solution or some particular solution of different types of trigonometric equation.
1. If sin θ = 0 then θ = nπ, where n = zero or any integer.
2. If sin θ = sin ∝ then θ = nπ + (-1)
n
n
∝, where n = zero or any integer.
3. If sin θ = 1 then θ = (4n + 1)
π
2
π2
, where n = zero or any integer.
4. If sin θ = -1 then θ = (4n - 1)
π
2
π2
, where n = zero or any integer.
5. If cos θ = 0 then θ = (2n + 1)
π
2
π2
, where n = zero or any integer.
6. If cos θ = cos ∝ then θ = 2nπ ± ∝, where n = zero or any integer. i hooe its help you plzz mark me brainliest ans
1. If sin θ = 0 then θ = nπ, where n = zero or any integer.
2. If sin θ = sin ∝ then θ = nπ + (-1)
n
n
∝, where n = zero or any integer.
3. If sin θ = 1 then θ = (4n + 1)
π
2
π2
, where n = zero or any integer.
4. If sin θ = -1 then θ = (4n - 1)
π
2
π2
, where n = zero or any integer.
5. If cos θ = 0 then θ = (2n + 1)
π
2
π2
, where n = zero or any integer.
6. If cos θ = cos ∝ then θ = 2nπ ± ∝, where n = zero or any integer. i hooe its help you plzz mark me brainliest ans
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