To solve the equation (tanθ - ) (sinθ - 1) = 060°90°240°300°120°, we can follow these steps:

Step 1: Expand the equation:
tanθ * sinθ - tanθ - sinθ + 1 = 0

Step 2: Rearrange the equation:
tanθ * sinθ - sinθ - tanθ + 1 = 0

Step 3: Factor out sinθ and tanθ:
sinθ(tanθ - 1) - (tanθ - 1) = 0

Step 4: Combine like terms:
(tanθ - 1)(sinθ - 1) = 0

Step 5: Set each factor equal to zero and solve for θ:
tanθ - 1 = 0 or sinθ - 1 = 0

For tanθ - 1 = 0:
tanθ = 1
θ = arctan(1)
θ = 45° + n * 180°, where n is an integer

For sinθ - 1 = 0:
sinθ = 1
θ = arcsin(1)
θ = 90° + n * 180°, where n is an integer

Therefore, the possible values of θ are:
θ = 45° + n * 180°, where n is an integer
θ = 90° + n * 180°, where n is an integer

Question

To solve the equation (tanθ - ) (sinθ - 1) = 060°90°240°300°120°, we can follow these steps:

Step 1: Expand the equation:
tanθ * sinθ - tanθ - sinθ + 1 = 0

Step 2: Rearrange the equation:
tanθ * sinθ - sinθ - tanθ + 1 = 0

Step 3: Factor out sinθ and tanθ:
sinθ(tanθ - 1) - (tanθ - 1) = 0

Step 4: Combine like terms:
(tanθ - 1)(sinθ - 1) = 0

Step 5: Set each factor equal to zero and solve for θ:
tanθ - 1 = 0   or   sinθ - 1 = 0

For tanθ - 1 = 0:
tanθ = 1
θ = arctan(1)
θ = 45° + n * 180°, where n is an integer

For sinθ - 1 = 0:
sinθ = 1
θ = arcsin(1)
θ = 90° + n * 180°, where n is an integer

Therefore, the possible values of θ are:
θ = 45° + n * 180°, where n is an integer
θ = 90° + n * 180°, where n is an integer

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