Unit Circle Values

Intro: We normalize the angle and return exact values (fractions & radicals) plus a decimal check.

Worked example

• θ = 5π/6.



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• Normalize (already principal): $$\theta=\tfrac{5\pi}{6}\in(0,\pi).$$



• Reference angle: $$\alpha = \pi-\theta = \pi-\tfrac{5\pi}{6} = \tfrac{\pi}{6}.$$



• Exact values at the reference: $$\cos\alpha = \tfrac{\sqrt{3}}{2},\quad \sin\alpha = \tfrac{1}{2},\quad \tan\alpha = \tfrac{1}{\sqrt{3}}.$$



• Quadrant: $$\theta\in\text{QII}\;\Rightarrow\; \cos<0,\; \sin>0,\; \tan<0.$$



• Apply signs: $$\cos\theta = -\tfrac{\sqrt{3}}{2},\quad \sin\theta = \tfrac{1}{2},\quad \tan\theta = -\tfrac{1}{\sqrt{3}} = -\tfrac{\sqrt{3}}{3}.$$



• Coordinate on unit circle: $$(\cos\theta,\sin\theta)=\Big(-\tfrac{\sqrt{3}}{2},\tfrac{1}{2}\Big).$$



• Decimal check (≈): $$\cos\theta\approx-0.8660,\; \sin\theta\approx0.5000,\; \tan\theta\approx-0.57735.$$



• Answer: $$\boxed{(\cos\theta,\sin\theta,\tan\theta)=\Big(-\tfrac{\sqrt{3}}{2},\tfrac{1}{2},-\tfrac{\sqrt{3}}{3}\Big)}.$$





• θ = −135°.



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• Normalize (to [0°,360°) if desired): $$-135^{\circ}+360^{\circ}=225^{\circ}.$$



• Reference angle: $$\alpha = 225^{\circ}-180^{\circ}=45^{\circ}.$$



• Exact reference values: $$\cos45^{\circ}=\sin45^{\circ}=\tfrac{\sqrt{2}}{2},\quad \tan45^{\circ}=1.$$



• Quadrant for 225° (QIII): $$\cos<0,\; \sin<0,\; \tan>0.$$



• Apply signs: $$\cos(-135^{\circ})=\cos(225^{\circ})=-\tfrac{\sqrt{2}}{2},\quad \sin(-135^{\circ})=\sin(225^{\circ})=-\tfrac{\sqrt{2}}{2},\quad \tan(-135^{\circ})=1.$$



• Coordinate: $$(\cos\theta,\sin\theta)=\Big(-\tfrac{\sqrt{2}}{2},-\tfrac{\sqrt{2}}{2}\Big).$$



• Decimal check (≈): $$\cos\theta\approx-0.70711,\; \sin\theta\approx-0.70711,\; \tan\theta\approx1.$$



• Answer: $$\boxed{(\cos\theta,\sin\theta,\tan\theta)=\Big(-\tfrac{\sqrt{2}}{2},-\tfrac{\sqrt{2}}{2},1\Big)}.$$

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Related

• Deg↔Rad
• Unit Circle Quiz