Write $$ p^{3} \cdot p $$ without exponents. $$ p^{3} \cdot p=\prod $$ Fill in the blank. $$ p^{3} \cdot p=p $$

Question

UpStudy AI · Accepted Answer

To write $$ p^{3} \cdot p $$ without exponents, we can use the property of exponents that states when multiplying like bases, we add the exponents.

Here, we have:

$$
p^{3} \cdot p = p^{3} \cdot p^{1} = p^{3+1} = p^{4}
$$

Thus, the expression $$ p^{3} \cdot p $$ can be rewritten as:

$$
p^{3} \cdot p = p \cdot p \cdot p \cdot p
$$

So, filling in the blank, we have:

$$
p^{3} \cdot p = \prod_{i=1}^{4} p
$$

Therefore, the final answer is:

$$
p^{3} \cdot p = p \cdot p \cdot p \cdot p
$$
$$ p^{3} \cdot p = p \cdot p \cdot p \cdot p $$

Write \( p^{3} \cdot p \) without exponents. \( p^{3} \cdot p=\prod \) Fill in the blank. \( p^{3} \cdot p=p \)