What Is the Value of Root 3 in Decimal Form with Proof and Solved Examples
The concept of Value of Root 3 (√3) plays a key role in mathematics and is widely applicable to geometry, trigonometry, and various exam situations. Accurate knowledge of √3 helps students quickly solve problems involving triangles, area, and trigonometric values.
What Is Value of Root 3 (√3)?
The Value of Root 3 (also written as √3) is a mathematical constant. It is defined as the positive number that, when multiplied by itself, equals 3. In mathematical terms, √3 × √3 = 3. You’ll find this concept applied in trigonometry (especially in sin 60°, tan 60°), geometry (like the area of equilateral triangles), and measurement problems involving diagonals or altitudes.
Decimal Value of Root 3
| Root | Decimal Value | Surd/Exact Form |
|---|---|---|
| √2 | 1.414 | √2 |
| √3 | 1.732 | √3 |
| √5 | 2.236 | √5 |
The value of root 3 up to three decimal places is 1.732. It is an irrational number, so its actual decimal expansion continues forever without repeating. For most school exams and calculations, you can safely use 1.732 or 1.73 as the value of √3 unless more precision is required.
How to Calculate Square Root of 3?
Root 3 is not a perfect square, so we use the long division method to estimate its value. Here are the steps:
- Write 3 as 3.000000, grouping zeros in pairs after the decimal.
- Find the biggest integer whose square is ≤ 3 (that’s 1). Place 1 in the quotient; 1 × 1 = 1. Subtract: 3 – 1 = 2.
- Bring down the first pair of zeros. The new dividend is 200.
- Double the quotient: 2 × 1 = 2. Write it as the new divisor’s first digit (20_).
- Find a digit to fit as the next quotient and divisor digit so (20_ × _) is ≤ 200 (answer: 27).
- Continue with more pairs of zeros for more decimal places.
After two steps, you get √3 ≈ 1.73. More steps will give √3 ≈ 1.73205.
Why Is Root 3 (√3) Irrational?
Root 3 cannot be expressed as a fraction of two whole numbers. Its decimal part does not terminate or repeat, making it an irrational number. In proofs, we show that if √3 were rational, then 3 would have to divide the square of any numerator in its fraction form, leading to a contradiction unless it was a perfect square, which it is not.
Where Is Value of Root 3 Used?
- Trigonometric ratios: sin 60° = √3/2, tan 60° = √3
- Area of equilateral triangle: (√3 / 4) × side²
- Altitude/height of equilateral triangle: (√3 / 2) × side
- Diagonals in cube/cuboid or finding lengths in geometry
- Formulas in physics and electrical engineering (like 3-phase power)
Key Formula Block Involving Root 3 (√3)
- Area of equilateral triangle = (√3/4) × a²
- Height = (√3/2) × a
- sin 60° = √3 / 2
- tan 60° = √3
Solved Example Using Root 3
Example 1: Find the height of an equilateral triangle whose side is 6 cm.
2. Substitute side: Height = (√3/2) × 6 = 3√3 cm
3. Substitute √3 ≈ 1.732: Height ≈ 3 × 1.732 = 5.196 cm
4. Final Answer: Height ≈ 5.196 cm
Example 2: What is the value of tan 60°?
2. Use decimal: tan 60° ≈ 1.732
Tips & Tricks to Remember Value of Root 3
- Remember: √2 ≈ 1.414, √3 ≈ 1.732, √5 ≈ 2.236
- A triangle with sides 1-√3-2 is often used for sin and tan 60°
- Write key roots on a formula page for last-minute revision
- For MCQs, use 1.73 or 1.732; for higher accuracy use more decimals
Common Pitfalls and Misunderstandings
- Forgetting that √3 is irrational, not a simple fraction
- Using too few decimal places when more accuracy is needed
- Mixing up root 3 (√3) with root 2 (√2), especially in geometry/trig
How Value of Root 3 Links to Other Concepts
Knowing the value of root 3 is essential for solving area and height problems in triangles, especially equilateral and 30-60-90 ones. It’s also central in learning trigonometric values and comparing with root 2 and root 5. For more on calculation methods, see square root long division method.
Quick Classroom Tip
Link the number 1.732 to the 60° angle in triangles—whenever you see tan 60° or sin 60°, recall that √3 appears in their values. Vedantu teachers use memory tricks and tables to help students remember such roots easily during sessions.
We explored the value of root 3—from definition, decimal expansion, calculation methods, main uses, and solved examples, to common mistakes and tricks to remember it. Keep practicing and use live classes or revision notes from Vedantu to master root values for exams and beyond.
Recommended Reads: Value of Root 2 | Value of Root 5 | Square Root Long Division Method | Trigonometric Ratios of Standard Angles
FAQs on Value of Root 3 Explained with Meaning and Uses
1. What is the value of root 3?
The value of √3 is approximately 1.732. It is an irrational number, meaning its decimal expansion is non-terminating and non-repeating. In mathematics, √3 represents the positive number which, when multiplied by itself, equals 3.
2. Is root 3 a rational or irrational number?
The number √3 is irrational. This means it cannot be expressed as a simple fraction of two integers. Its decimal form (1.7320508...) continues infinitely without repeating, which is a key property of irrational numbers.
3. How do you find the value of root 3?
The value of √3 can be found using the long division method or a calculator, giving approximately 1.732.
- Step 1: Pair the digits of 3 as 3.00 00...
- Step 2: Use the long division square root algorithm.
- Step 3: Continue the process to get decimal places.
4. What is the value of root 3 in fraction form?
The exact value of √3 cannot be written as a fraction because it is irrational. However, an approximate fractional value is 1732/1000 or simplified as 866/500, which represents 1.732 approximately.
5. What is the square of root 3?
The square of √3 is 3. This follows directly from the definition of a square root: (√3)² = 3. Squaring a square root always gives back the original number.
6. What is the value of 1 divided by root 3?
The value of 1/√3 is approximately 0.577. After rationalizing the denominator:
- 1/√3 × √3/√3 = √3/3
7. What is the value of root 3 in trigonometry?
In trigonometry, √3 commonly appears in special angles like 30° and 60°. Key values include:
- tan 60° = √3
- sin 60° = √3/2
- cos 30° = √3/2
8. How is root 3 related to a 30-60-90 triangle?
In a 30-60-90 triangle, the side ratios are 1 : √3 : 2. If the shortest side (opposite 30°) is 1, then:
- Side opposite 60° = √3
- Hypotenuse = 2
9. What is the cube of root 3?
The cube of √3 is 3√3. This is calculated as:
- (√3)³ = (√3 × √3 × √3)
- = 3√3
10. Why is root 3 important in mathematics?
The number √3 is important because it appears in geometry, trigonometry, and algebra, especially in special triangles and irrational numbers. It is commonly used in:
- 30-60-90 triangle ratios
- Trigonometric values of 60°
- Simplifying radical expressions
