Can negative numbers be perfect cubes?

Yes. Any integer whose absolute value is a perfect cube is itself a perfect cube — including negatives. Examples: -1, -8, -27, -64, -125, -216, -343, -512, -729, -1000.

Is -10648 a Perfect Cube? Yes — ∛(-10648) = -22

Q: Is -10648 a perfect cube?

Yes. (-22) × (-22) × (-22) = -10648, so ∛(-10648) = -22. Unlike perfect squares, negative integers can be perfect cubes.

Quick Answer

Yes, -10648 is a perfect cube. ∛(-10648) = -22.

Because (-22) × (-22) × (-22) = -10648. (Unlike squares, negatives can be perfect cubes.)

Perfect Cube Checker

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

Use the checker above to determine whether any integer is a perfect cube. A perfect cube is an integer of the form k³ for some integer k. Unlike perfect squares, perfect cubes can be negative: since (-k)³ = -k³, every negative integer whose absolute value is a perfect cube is itself a perfect cube. The first non-negative perfect cubes are 0, 1, 8, 27, 64, 125, 216, 343, 512, 729, 1000, ...

Step-by-Step: Why -10648 Is a Perfect Cube

Write -10648 as -(10648).
∛10648 = 22, so ∛(-10648) = -22.
Verify: (-22) × (-22) × (-22) = -10648 ✓
Unlike perfect squares, negative integers can be perfect cubes because the cube of a negative is negative.
Prime factorization check (of |n| = 10648):
10648 = 2³ × 11³
All exponents are divisible by 3 ⇒ 10648 is a perfect cube.

∛(-10648) = -22

What Is a Perfect Cube?

A perfect cube is an integer that is the cube of an integer:

n is a perfect cube ⇔ n = k³, k ∈ ℤ

Equivalently, n is a perfect cube if and only if ∛n is an integer. Geometrically, you can arrange n identical unit cubes into a cubic grid only if n is a non-negative perfect cube.

Signs: Unlike perfect squares (which are always non-negative), perfect cubes can be negative. Examples of negative perfect cubes: -1 = (-1)³, -8 = (-2)³, -27 = (-3)³, -64 = (-4)³, -125 = (-5)³.

Prime-factorization rule: |n| is a perfect cube iff every prime in its prime factorization appears with an exponent divisible by 3. For example, 216 = 2³ × 3³ (both divisible by 3) is a perfect cube; 72 = 2³ × 3² has exponent 2 on 3, so it is not.

Nearby Examples

n	Is perfect?	∛n or nearest
2197	Yes	∛2197 = 13
1728	Yes	∛1728 = 12
1331	Yes	∛1331 = 11
1000	Yes	∛1000 = 10
729	Yes	∛729 = 9
512	Yes	∛512 = 8
343	Yes	∛343 = 7
216	Yes	∛216 = 6

Related Operations

Cube Root of 10648 — decimal value with Newton's Method
What is -10648 Cubed? — compute n³

References

Popular Perfect-Cube Checks

Common ‘Is N a perfect cube?’ queries — click any to see the step-by-step verdict (includes negative cubes):

Related Calculators

Cube Root Calculator (∛n) — decimal value with step-by-step
Simplify Cube Root — radical form
Cubed Calculator (n³) — the inverse direction
Is N a Perfect Square? — the square analog
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