Angle Sum and Difference Calculator
📐 Angle Sum and Difference Calculator – Solve Trigonometric Identities with Ease
An Angle Sum and Difference Calculator helps you evaluate sine, cosine, and tangent values of compound angles using angle sum and difference identities — without manually memorizing or computing each formula.
Perfect for students, teachers, engineers, and anyone dealing with trigonometric expressions.
🧠 What Are Angle Sum and Difference Formulas?
In trigonometry, these formulas allow you to calculate trig functions of angle combinations, such as sin(A+B)\sin(A + B)sin(A+B), cos(A−B)\cos(A – B)cos(A−B), etc.
✅ Common Identities:
- Sine: sin(A±B)=sinAcosB±cosAsinB\sin(A \pm B) = \sin A \cos B \pm \cos A \sin Bsin(A±B)=sinAcosB±cosAsinB
- Cosine: cos(A±B)=cosAcosB∓sinAsinB\cos(A \pm B) = \cos A \cos B \mp \sin A \sin Bcos(A±B)=cosAcosB∓sinAsinB
- Tangent: tan(A±B)=tanA±tanB1∓tanAtanB\tan(A \pm B) = \frac{\tan A \pm \tan B}{1 \mp \tan A \tan B}tan(A±B)=1∓tanAtanBtanA±tanB
🔢 Example:
Calculate sin(75∘)\sin(75^\circ)sin(75∘)
Use identity: sin(75∘)=sin(45∘+30∘)=sin(45∘)cos(30∘)+cos(45∘)sin(30∘)\sin(75^\circ) = \sin(45^\circ + 30^\circ) = \sin(45^\circ)\cos(30^\circ) + \cos(45^\circ)\sin(30^\circ)sin(75∘)=sin(45∘+30∘)=sin(45∘)cos(30∘)+cos(45∘)sin(30∘)
Substitute known values: =22⋅32+22⋅12=6+24= \frac{\sqrt{2}}{2} \cdot \frac{\sqrt{3}}{2} + \frac{\sqrt{2}}{2} \cdot \frac{1}{2} = \frac{\sqrt{6} + \sqrt{2}}{4}=22⋅23+22⋅21=46+2
The calculator does this instantly!
🎯 Why Use an Angle Sum & Difference Calculator?
- ✅ Saves time and reduces human error
- ✅ Supports degrees and radians
- ✅ Simplifies learning and checking homework
- ✅ Outputs exact values or decimal approximations
- ✅ Helpful in trigonometric proofs and simplification
📚 Applications
- Trigonometry & geometry classes
- Physics (wave motion, phase shifts)
- Engineering (angles in mechanics)
- Signal processing & robotics
- Advanced math competitions
❓FAQs – Angle Sum and Difference Calculator
🔹 Can I input values in radians?
✅ Yes, most calculators let you toggle between degrees and radians.
🔹 Will it show step-by-step solutions?
Many calculators do. Look for options labeled “show steps” or “detailed solution”.
🔹 What if the angle isn’t standard like 37°?
You can still input custom values — the calculator will give numerical answers using decimal approximations.
🔹 Can this be used on mobile?
Most online calculators are mobile-responsive, and some are available as apps.