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21 June, 07:53

Solve the following equation on the interval [0, 2π). tan^2x sin x = tan^2x

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  1. 21 June, 08:59
    0
    Given

    tan (x) ²·sin (x) = tan (x) ²

    Find

    x on the interval [0, 2π)

    Solution

    Subtract the right side and factor. Then make use of the zero-product rule.

    ... tan (x) ²·sin (x) - tan (x) ² = 0

    ... tan (x) ²· (sin (x) - 1) = 0

    This is an indeterminate form at x = π/2 and undefined at x = 3π/2. We can resolve the indeterminate form by using an identity for tan (x) ²:

    ... tan (x) ² = sin (x) ²/cos (x) ² = sin (x) ² / (1 - sin (x) ²)

    Then our equation becomes

    ... sin (x) ²· (sin (x) - 1) / ((1 - sin (x)) (1 + sin (x))) = 0

    ... - sin (x) ² / (1 + sin (x)) = 0

    Now, we know the only solutions are found where sin (x) = 0, at ...

    ... x ∈ {0, π}
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