What is the simplified form of ∛238?

The cube root of 238 is already in simplest form: ∛238 ≈ 6.1972. Since 238 has no perfect cube factors greater than 1, it cannot be simplified further.

How do you simplify the cube root of 238?

To simplify ∛238, find the prime factorization of 238, group the factors in triples (groups of three), and move each complete triple outside the radical sign. Any factors not part of a complete triple remain inside.

Is ∛238 rational or irrational?

∛238 is irrational. Although it can be written in the simplified radical form ∛238, its decimal expansion (6.1972...) never terminates or repeats.

Simplify the Cube Root of 238 = ∛238

Quick Answer

∛238 = ∛238 (≈ 6.1972)

Formula: 238 has no perfect-cube factor > 1 → ∛238 is already simplest

Simplify Cube Root Calculator

Simplify ∛ Cube Root Cubed (n³) Is N a Perfect Cube?

Use the calculator above to simplify any cube root to its simplest radical form (e.g. ∛24 = 2∛3). See below the step-by-step method using prime factorization, plus a table of common simplified cube roots.

Step-by-Step: Simplify ∛238

To simplify ∛238, find the largest perfect cube that divides 238:

238 = 1 × 238
∛238 = ∛1 × ∛238
∛238 = ∛238

In decimal form: ∛238 ≈ 6.1972

See prime factorization details

Prime factorization: 238 = 2 × 7 × 17

Group the identical primes in triples (three of a kind); each complete triple contributes one factor outside the radical, and any leftovers (1 or 2 of the same prime) stay inside.

Formula

To rewrite any cube root in simplest radical form:

∛(a³ · b) = a · ∛b

Where:

a³ = the largest perfect-cube factor of the radicand (the number under the ∛ symbol)
b = the remaining cubefree factor (no perfect cube divides it other than 1)

Worked example for ∛24:

24 = 8 × 3 = 2³ × 3
So a³ = 8, a = 2, b = 3
Therefore ∛24 = 2∛3

How to Simplify Cube Roots

Simplifying a cube root means rewriting it in the simplest radical form, where the number under the radical (the radicand) has no perfect cube factors other than 1.

Method: Prime Factorization

Find the prime factorization of the radicand.
Identify triples (groups of three) of identical prime factors.
Each complete triple contributes one factor outside the radical.
Any prime factor not part of a complete triple (1 or 2 leftovers) stays under the radical.

Example: Simplify ∛128

128 = 2 × 2 × 2 × 2 × 2 × 2 × 2 = 2⁷
We have two complete triples of 2's (2³ × 2³) plus a leftover 2.
Each triple → contributes one 2 outside. Two triples → 2 × 2 = 4 outside. The leftover 2 stays inside.
∛128 = 4∛2

Nearby Simplified Cube Roots

Click any value to see the full step-by-step solution.

∛n	Simplified	≈ Decimal
∛125	5	5.0000
∛128	4∛2	5.0397
∛135	3∛5	5.1299
∛162	3∛6	5.4514
∛189	3∛7	5.7388
∛192	4∛3	5.7690
∛216	6	6.0000
∛243	3∛9	6.2403
∛250	5∛2	6.2996
∛256	4∛4	6.3496
∛320	4∛5	6.8399
∛343	7	7.0000

Want the Decimal Value Instead?

If you want the decimal approximation (e.g. ∛24 ≈ 2.8845) with the Newton's Method step-by-step, use our Cube Root Calculator.

Is 238 Itself a Perfect Cube?

If the radicand 238 is itself a perfect cube (e.g. 216 = 6³), then ∛238 simplifies to an integer. Check with our Perfect Cube Checker for the verdict + prime-factorization proof.

References

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