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- Express in terms of sine and cosine
- Simplify
- Simplify into a single function
- Express in terms of Sine
- Express in terms of Cosine
- Express in terms of Tangent
- Express in terms of Cotangent
- Express in terms of Secant
- Express in terms of Cosecant
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Applying the trigonometric identity: $\cos\left(\theta \right)\sec\left(\theta \right) = 1$
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$\frac{\sin\left(t\right)^2\left(\sec\left(t\right)+1\right)}{\cos\left(t\right)\tan\left(t\right)}=1+\tan\left(t\right)$
Learn how to solve problems step by step online. Solve the trigonometric equation (sin(t)^2(sec(t)+cos(t)sec(t)))/(cos(t)tan(t))=1+tan(t). Applying the trigonometric identity: \cos\left(\theta \right)\sec\left(\theta \right) = 1. Applying the trigonometric identity: \tan\left(\theta \right)\cos\left(\theta \right) = \sin\left(\theta \right). Simplify the fraction \frac{\sin\left(t\right)^2\left(\sec\left(t\right)+1\right)}{\sin\left(t\right)} by \sin\left(t\right). Multiplying polynomials \sin\left(t\right) and \sec\left(t\right)+1.
