Express 18k³ ÷ 3k³
To simplify the expression 18k³ ÷ 3k³, we can divide the coefficients and divide the exponents of k separately:
18k³ ÷ 3k³ = (18 ÷ 3) * (k³ ÷ k³)
18 ÷ 3 = 6, since 18 divided by 3 equals 6.
k³ ÷ k³ = k^(3-3) = k⁰, since dividing two expressions with the same base results in subtracting their exponents.
k⁰ = 1, since any number raised to the power of 0 equals 1.
Therefore, 18k³ ÷ 3k³ simplifies to 6.
To simplify the expression 18k³ ÷ 3k³, we can divide the coefficients (18 ÷ 3) and subtract the exponents (k³ ÷ k³).
First, let's simplify the coefficients:
18 ÷ 3 = 6
Now, let's simplify the exponents:
k³ ÷ k³ = 1
Putting it all together, the expression simplifies to:
6 * 1 = 6
Therefore, 18k³ ÷ 3k³ simplifies to 6.