Question

Apply When subtracting or adding two numbers in scientific notation, why do the exponents need to be the same?

Short answer

When adding or subtracting numbers in scientific notation, it is necessary to have the same exponents in order to align the place values correctly. Different powers of 10 represent different place values, so performing arithmetic operations with different exponents doesn't make sense. Making the exponents equal allows us to add or subtract the "a" values while keeping the power of 10 unchanged, ensuring the meaning of the original values is not compromised.

Step-by-step solution

Understand scientific notation

Scientific notation is a way to express large or small numbers, typically using powers of 10. A number in scientific notation is written as the product of two numbers: a number between 1 and 10, and a power of 10. The general format for scientific notation is \(a * 10^b\), where "a" is the number between 1 and 10, and "b" is an integer representing the power of 10.

Understand why same exponents are necessary for adding or subtracting

When adding or subtracting numbers in scientific notation, it is necessary to have the same exponent so that we are aligning the place values correctly. Different powers of 10 represent different place values, and adding or subtracting with different place values doesn't make sense. For example, we cannot directly add or subtract 10 and 1 with exponents 2 and 1, respectively, as we would not align the place values of the numbers correctly.

Align exponents

Before adding or subtracting numbers in scientific notation, make sure the exponents are equal. If they aren't equal, adjust one or both numbers to have the same exponent. To do this, increase or decrease one of the exponents and simultaneously change the "a" value accordingly so that the number itself remains the same. For example, if we want to add \(3 * 10^4\) and \(2 * 10^2\), adjust the second number by changing it to \(0.02 * 10^4\) so that \(3 * 10^4 + 0.02 * 10^4 = (3 + 0.02) * 10^4\).

Add or subtract the numbers

Now that the exponents are equal, add or subtract the "a" values while keeping the power of 10 unchanged. Following the example above, \(3 * 10^4 + 0.02 * 10^4 = (3 + 0.02) * 10^4 = 3.02 * 10^4\).

Check if the resulting number is in proper scientific notation

Finally, check if the resulting number is in proper scientific notation (i.e., the "a" value should be between 1 and 10). If it isn't, adjust the number accordingly while ensuring that the product remains the same. For instance, if our result was \(12.3 * 10^4\), we would adjust it to \(1.23 * 10^5\) by changing the "a" value and increasing the exponent by 1. In summary, it is essential to have the same exponents when adding or subtracting numbers in scientific notation to correctly align the place values of the numbers. Doing so allows us to perform arithmetic operations on the numbers without compromising the meaning of their original values.

Key concepts

Understanding Arithmetic Operations in Scientific Notation

When working with scientific notation, arithmetic operations often require special attention. Scientific notation simplifies computations involving very large or very small numbers by expressing them as a product of a decimal number and a power of ten.
This method is particularly useful for maintaining precision and scale during operations like addition, subtraction, multiplication, and division.

For addition and subtraction, however, the exponents must be the same for accurate results. This ensures that place values align correctly.

• Addition/Subtraction: Adjust one or both numbers so their exponents match, then proceed with the operation on the decimal parts.
• Multiplication: Multiply the decimal parts and add the exponents.
• Division: Divide the decimal parts and subtract the exponents.

These techniques help preserve the correctness of calculations and avoid confusion that might arise from mismatched place values.

The Role of Exponents in Scientific Notation

Exponents are a vital part of scientific notation, enabling the simplification of large or small numbers. They indicate the power of ten by which the base number is multiplied.
In scientific notation, every number is expressed as \(a \times 10^b\), where \(a\) is a decimal number between 1 and 10, and \(b\) is an integer exponent.

This format helps in measuring and comparing vast ranges of values efficiently.

• For addition and subtraction, the exponents must be equal. Different exponents represent different powers of ten, leading to misaligned place values if not adjusted.
• In multiplication and division, exponents are manipulative variables that simplify the process by adding or subtracting them respectively.

Thus, understanding and correctly using exponents is crucial for performing operations accurately in scientific notation.

Aligning Place Values in Scientific Notation

Place values are essential in keeping numbers correctly positioned based on their magnitude. In scientific notation, aligning place values is crucial, especially during addition and subtraction.
Let's consider why: place values in regular number format represent different scales.
Numbers like 1000 and 100 are in different place values because of their exponent differences in scientific notation.

Before adding or subtracting, we modify either or both numbers so their exponents align. For instance, converting \(2 \times 10^3\) and \(3 \times 10^2\) into the same exponent format results in \(20 \times 10^2\) for the first number, aligning both numbers for easy arithmetic.

• Without matching exponents:
  Numbers may seem closer or further apart than they are due to differing place values.
• When exponents align, place values can match like in standard arithmetic operations, ensuring accurate results.

Aligning place values helps clear up any confusion and avoids errors during calculations, making scientific notation reliably efficient.