Question

\(13\left(8^{3 / 4}\right)-4\left(8^{3 / 4}\right)\)

Short answer

The simplified form of the given expression is \(9\left(8^{3 / 4}\right)\)

Step-by-step solution

Identify like terms

Both terms in the expression, \(13\left(8^{3 / 4}\right)\) and \(4\left(8^{3 / 4}\right)\) have the same base 8^{3/4}. We can consider them as like terms.

Apply distributive law

According to the distributive law, like terms can be combined together. Hence, we simply subtract \(4\left(8^{3 / 4}\right)\) from \(13\left(8^{3 / 4}\right)\).

Simplify the expression

After subtracting, we find the solution to the expression, which should be \(9\left(8^{3 / 4}\right)\)

Key concepts

Understanding Like Terms

When simplifying algebraic expressions, recognizing like terms is crucial. Like terms are expressions that have exactly the same variable parts raised to the same power. They may differ in numerical coefficient but share the same variable factor.

For example, in the given problem, both terms, \(13(8^{3/4})\) and \(4(8^{3/4})\), have the variable part \(8^{3/4}\). Because the variable parts are identical, these terms are like terms, despite having different coefficients (13 and 4, respectively).

Understanding like terms allows us to combine and simplify expressions efficiently, since only like terms can be added or subtracted. This is similar to adding apples with apples, not mixing them with oranges. The ability to identify like terms is a cornerstone for algebraic manipulation and simplification.

Applying the Distributive Law

The distributive law, also known as the distributive property, is a cornerstone in algebra that lets us multiply a single term by a sum or difference of terms inside parentheses and vice versa.

Here's how it works: Given an expression like \(a(b + c)\), the distributive law tells us that we can 'distribute' the \(a\) across the \(b + c\), giving \(ab + ac\). Conversely, when we have \(ab + ac\), we can factor out the \(a\) to return to the original form \(a(b + c)\).

In our problem, we could distribute the subtraction sign inside the parentheses. However, since we have like terms with the same variable part, the distributive law simplifies the process, enabling us to subtract the coefficients directly which results in \(13(8^{3/4}) - 4(8^{3/4})\) being simplified to \(9(8^{3/4})\), reflecting the combined like terms.

Navigating Exponent Rules

Exponent rules, sometimes called the 'laws of exponents', are a set of rules that describe how to handle operations involving exponents. They include the product rule, quotient rule, power rule, and more.

In the context of our example, it's important to understand that we don't need to apply complex exponent rules because the expression \(8^{3/4}\) remains unchanged. Both terms in the original problem already have the base and exponent simplified and there is no operation between the exponents to perform.

However, when dealing with different algebraic expressions, exponent rules come in handy to simplify terms with the same base or to express large multiplication or division of exponents elegantly. For instance, when multiplying two terms with the same base, we would add the exponents, and when dividing, we would subtract the exponents of the common base.