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Chapter 1: Problem 78

Simplify by combining like terms. $$ 8 j^{3}-9 j^{3} $$

Short Answer

Expert verified
The simplified expression is \(-j^3\).

Step by step solution

01

Identify Like Terms

In this expression, identify the terms you will combine. The terms are \(8j^3\) and \(-9j^3\). Both are like terms since they have the same variable and exponent.
02

Combine the Coefficients

Combine the coefficients of the like terms. This means calculating \(8 - 9\).
03

Simplify the Expression

The result from combining the coefficients will give you \(8 - 9 = -1\). Therefore, the simplified expression is \(-1j^3\).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Like Terms
In algebra, the concept of "like terms" is crucial for simplifying expressions. Like terms are terms that have the same variables raised to the same power. For instance, in the expression given: \(8j^3\) and \(-9j^3\), both terms share the same variable \(j\) and are raised to the third power \(j^3\). This categorizes them as "like" terms.
Understanding this helps in simplifying processes because like terms can be combined through operations such as addition or subtraction. This is crucial when you're trying to simplify a polynomial expression, ensuring that the expressions shrink to their simplest form. By only combining like terms, we maintain accuracy in our simplification process.
Combining Coefficients
When we combine like terms, we focus on their coefficients. Coefficients are the numerical parts of the terms. For instance, in \(8j^3\), \(8\) is the coefficient. Similarly, \(-9\) is the coefficient in \(-9j^3\).
To combine these, we perform basic arithmetic on their coefficients. In this case, you subtract \(9\) from \(8\), resulting in \(-1\).
  • Step 1: Identify the coefficients of the "like terms".
  • Step 2: Perform the arithmetic operation (addition or subtraction).
  • Step 3: Apply the result to the common variable and power.
By focusing solely on the coefficients, we ensure that the variables are not altered during the process, leading to an accurate simplified form of the polynomial.
Polynomial Expression
A polynomial expression is made up of variables, coefficients, and exponents. Each separate part of a polynomial is called a "term." It's important to note that a polynomial can have multiple terms. For example, in the expression given, \(8j^3 - 9j^3\), there are two terms.
Polynomials can get complicated, especially when they have several terms and variables. Hence, simplifying them by combining the like terms helps to manage their complexity. This also makes further algebraic operations easier to perform.
By simplifying polynomial expressions, you not only make the math easier but also prepare the expression for more advanced operations, such as derivative calculations or factoring. The key is recognizing like terms to reduce the expression into its simplest form, ensuring it's as manageable and streamlined as possible.

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Most popular questions from this chapter

World's Coldest lce Cream. Dippin' Dots is an ice cream snack that was invented by Curt Jones in \(1987 .\) The tiny multicolored beads are created by flash freezing ice cream mix in liquid nitrogen at a temperature of \(-355^{\circ} \mathrm{F} .\) When they come out of the processor, they are stored at a temperature of \(-40^{\circ} \mathrm{F} .\) Find the change in temperature of Dippin' Dots from production to storage.

Explain each error. Then give the correct answer. a. \(9(4 b-2)=36 b-2\) b. \(\quad 3(2 x)=6 \cdot 3 x=18 x\) c. \(-(23 c+2)=-23 c+2\) d. \((5 n+1) 2=5 n+2\)

True or false: \(-4>-5 ?\)

To determine the average afternoon wait time in security lines at an airport, officials monitored four passengers, each at a different gate. The time that each passenger entered a security line and the time the same passenger cleared the checkpoint was recorded, as shown below. Find the average (mean) wait time for these passengers. $$ \begin{array}{|l|c|c|} \hline & {\text { Time }} & {\text { Time }} \\ \hline & {\text { entered }} & {\text { cleared }} \\ \hline \text { Passenger at Gate A } & {3: 05 \text { pm }} & {3: 21 \text { pm }} \\ \hline \text { Passenger at Gate B } & {3: 03 \text { pm }} & {3: 13 \text { pm }} \\ \hline \text { Passenger at Gate C } & {3: 01 \text { pm }} & {3: 09 \text { pm }} \\ \hline \text { Passenger at Gate D } & {3: 02 \text { pm }} & {3: 16 \text { pm }} \\ \hline \end{array} $$

Suppose \(x\) is positive and \(y\) is negative. Determine whether each statement is true or false. a. \(x-y>0\) b. \(y-x<0\) c. \(|-x|<0\) d. \(-|y|<0\)
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