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Chapter 1: Problem 89

Simplify each expression and write it in the standard form \(a+b i\). \(4(5+3 i)\)

Short Answer

Expert verified
The expression simplifies to \(20 + 12i\).

Step by step solution

01

Distribute the 4 through the parenthesis

Multiply each term inside the parentheses by 4. This gives:\[ 4 \cdot 5 + 4 \cdot 3i \]
02

Perform Multiplications

Compute the multiplications from Step 1. This results in:\[ 20 + 12i \]
03

Write in Standard Form

The expression is already in the form \(a + bi\), where \(a = 20\) and \(b = 12\). Thus, the simplified expression is:\[ 20 + 12i \]

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Key Concepts

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

Simplifying Expressions
Simplifying expressions is an essential math skill, especially when working with complex numbers. The goal is to make an expression easier to understand or work with by manipulating it to a simpler form. When dealing with complex numbers, expressions often involve real and imaginary components. Simplifying these expressions involves combining like terms and performing arithmetic operations to reduce the expression to its simplest form.

In our original exercise, we started with a complex expression, namely: \(4(5 + 3i)\).To simplify this expression, we distributed the 4 across both terms within the parentheses and performed the necessary multiplications. This process involves several steps and utilizes mathematical properties, such as the distributive property, to simplify the original complex expression.
Standard Form
Standard form for complex numbers is essential because it provides a universal way of expressing any complex number. This format makes it easier to understand and compare different complex numbers. Complex numbers are usually represented in the form \(a + bi\), where \(a\) is the real part, and \(b\)i represents the imaginary part.

In our example, after performing the calculations, we ended with \(20 + 12i\), which is clearly in the standard form. This makes it easy to identify the real component, which is \(20\), and the imaginary component, which is \(12i\). Writing in the standard form is not just a formality. It greatly aids in operations like addition, subtraction, or comparing complex numbers.
Distributive Property
The distributive property is a fundamental concept in algebra that allows us to simplify expressions easily. It states that multiplying a number by a group of numbers added together is the same as doing each multiplication separately and then adding the results.

Mathematically, this property can be expressed as:\(a(b+c) = ab + ac\).In our example \(4(5 + 3i)\), the number \(4\) is distributed to both \(5\) and \(3i\), resulting in \(4  + 4 i = 20 + 12i\).This step simplifies the expression into two separate components, making it more manageable. Understanding the distributive property is crucial for simplifying complex numbers because it helps in breaking down expansions into smaller parts, making them easier to process.

Always remember, whenever you see parentheses with a multiplication outside, think about applying the distributive property to simplify your work!

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Most popular questions from this chapter

Use a logarithmic transformation to find a linear relationship between the given quantities and graph the \mathrm{\\{} r e s u l t i n g ~ l i n e a r ~ r e l a t i o n s h i p ~ o n ~ a ~ l o g - l o g ~ p l o t . ~ $$ y=4 x^{-3} $$

sketch the graph of each function. Do not use a graphing calculator. (Assume the largest possible domain.) $$ y=(x+1)^{3} $$

Use the indicated base to logarithmically transform each exponential relationship so that a linear relationship results. Then use the indicated base to graph each relationship either in log or semilog transformed coordinates so that a straight line results. $$ y=3 e^{-2 x} ; \text { base } 3 $$

Explain how the following functions can be obtained from \(y=\ln x\) by basic transformations: (a) \(y=\ln (x-1)\) (b) \(y=-\ln x+1\) (c) \(y=\ln (x+3)-1\)

The following table is based on a functional relationship between \(x\) and \(y\) that is either an exponential or a power function: \begin{tabular}{ll} \hline \(\boldsymbol{x}\) & \(\boldsymbol{y}\) \\ \hline \(0.1\) & \(0.067\) \\ \(0.5\) & \(0.22\) \\ 1 & \(1.00\) \\ \(1.5\) & \(4.48\) \\ 2 & \(20.09\) \\ \hline \end{tabular} Use an appropriate logarithmic transformation and a graph to decide whether the table comes from a power function or an exponential function, and find the functional relationship between and \(y\).
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