or Keyword: Use Double Angle Formulas.

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Presentation transcript:

or

Keyword: Use Double Angle Formulas

Keyword: Use Pythagorean Identities

Keywords: Break into a single sine term and the left-over terms; Then use a Pythagorean Identity on the left-over terms.

Keywords: Break into a single cosine term and the left-over terms; Then use a Pythagorean Identity on the left-over terms.

Keywords: Break into a tangent squared term and the left-over terms; Then use a Pythagorean Identity on the tangent squared term.

Keywords: Break into a cotangent squared term and the left-over terms; Then use a Pythagorean Identity on the cotangent squared term.

Keywords: Special use of Integration by Parts

Keywords: Use Double-Angle Formulas twice

Keywords: Break in to a tangent squared term and the left-over terms. Use Pythagorean Identity on the tangent squared term

Keywords: Break in to a cotangent squared term and the left-over terms. Use Pythagorean Identity on the cotangent squared term.

Keywords: Break in to a secant squared term and the left-over terms. Use Pythagorean Identity on the left-over terms.

Keywords: Break in to a cosecant squared term and the left-over terms. Use Pythagorean Identity on the left-over terms.

Keywords: Break into a single sine term and the left-over terms; Then use Pythagorean Identity on the left-over terms.

Keywords: Break into a single cosine term and the left-over terms; Then use Pythagorean Identity on the left-over terms.

Keywords: Break into a tangent squared term and the left-over terms; Then use Pythagorean Identity on the tangent squared terms.

Keywords: Break into a cotangent squared term and the left-over terms; Then use Pythagorean Identity on the cotangent squared term.

Keywords: Special use of Integration by Parts