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Scientific Notation and Standard Form

CSEC Mathematics: Number Representation

Essential Understanding: Scientific notation (also called standard form) is a powerful way to express very large or very small numbers in a compact, manageable format. Scientists, engineers, and mathematicians use this notation daily to work with numbers like the distance to stars or the size of atoms.

Key Skill: Converting to Standard Form
Exam Focus: Operations with Powers of 10
Problem Solving: Real-World Applications

What is Scientific Notation?

Scientific notation is a method of writing numbers as a product of two parts:

Standard Form Structure

\[ A \times 10^n \]

Where:

  • \( A \) is a number between 1 and 10 (i.e., \( 1 \leq A < 10 \))
  • \( n \) is an integer (positive, negative, or zero)
10n

The Components

Coefficient (A): Must be at least 1 but less than 10.

Base: Always 10 in scientific notation.

Exponent (n): Shows how many places the decimal point moves.

+

Large Numbers

Positive Exponent: When \( n > 0 \), the number is large.

Example:

\[ 759000 = 7.59 \times 10^5 \]

The decimal moves 5 places to the left.

-

Small Numbers

Negative Exponent: When \( n < 0 \), the number is small (between 0 and 1).

Example:

\[ 0.00759 = 7.59 \times 10^{-3} \]

The decimal moves 3 places to the right.

Understanding Powers of 10

10

Interactive Power of 10 Visualizer

100 = 1

Powers of 10 Reference Table

Power Expanded Form Value Name
\(10^6\) \(10 \times 10 \times 10 \times 10 \times 10 \times 10\) 1,000,000 Million
\(10^5\) \(10 \times 10 \times 10 \times 10 \times 10\) 100,000 Hundred Thousand
\(10^3\) \(10 \times 10 \times 10\) 1,000 Thousand
\(10^2\) \(10 \times 10\) 100 Hundred
\(10^1\) \(10\) 10 Ten
\(10^0\) - 1 One
\(10^{-1}\) \(\frac{1}{10}\) 0.1 Tenth
\(10^{-2}\) \(\frac{1}{100}\) 0.01 Hundredth
\(10^{-3}\) \(\frac{1}{1000}\) 0.001 Thousandth
\(10^{-6}\) \(\frac{1}{1000000}\) 0.000001 Millionth

Converting to Standard Form

Converting Large Numbers

1
Place the decimal point after the first non-zero digit to create a number between 1 and 10.
2
Count the places you moved the decimal point from its original position.
3
Write the power of 10: The exponent equals the number of places moved. For large numbers, the exponent is positive.
1

Worked Example: Large Number

Convert 759,000 to standard form.

1
Place decimal after first digit: 7.59000
2
Count places moved: 759000. → 7.59000 = 5 places to the left
3
Write in standard form: \( 759000 = 7.59 \times 10^5 \)

Converting Small Numbers (Decimals)

1
Place the decimal point after the first non-zero digit.
2
Count the places you moved the decimal point to the right.
3
Write the power of 10: The exponent is negative and equals the number of places moved.
2

Worked Example: Small Number

Convert 0.00759 to standard form.

1
Place decimal after first non-zero digit: 7.59
2
Count places moved: 0.00759 → 7.59 = 3 places to the right
3
Write in standard form: \( 0.00759 = 7.59 \times 10^{-3} \)

Remember This!

Large numbers (greater than 10): Decimal moves LEFT → Positive exponent

Small numbers (less than 1): Decimal moves RIGHT → Negative exponent

Quick Check: If your original number is BIG, the power should be positive (+). If it's SMALL, the power should be negative (-).

Converting from Standard Form to Ordinary Numbers

3

Worked Example: Positive Exponent

Convert \( 3.45 \times 10^4 \) to an ordinary number.

Solution: The exponent is +4, so move the decimal point 4 places to the right:

\[ 3.45 \times 10^4 = 3.4500 \rightarrow 34500 \]

Answer: 34,500

4

Worked Example: Negative Exponent

Convert \( 6.2 \times 10^{-4} \) to an ordinary number.

Solution: The exponent is -4, so move the decimal point 4 places to the left:

\[ 6.2 \times 10^{-4} = 0.00062 \]

Answer: 0.00062

Operations with Standard Form

Multiplication

\[ (A \times 10^m) \times (B \times 10^n) = (A \times B) \times 10^{m+n} \]

Multiply the coefficients and add the exponents.

5

Multiplication Example

Calculate: \( (3 \times 10^4) \times (2 \times 10^3) \)

Solution:

\[ = (3 \times 2) \times 10^{4+3} \]

\[ = 6 \times 10^7 \]

Division

\[ \frac{A \times 10^m}{B \times 10^n} = \frac{A}{B} \times 10^{m-n} \]

Divide the coefficients and subtract the exponents.

6

Division Example

Calculate: \( \frac{8 \times 10^6}{2 \times 10^2} \)

Solution:

\[ = \frac{8}{2} \times 10^{6-2} \]

\[ = 4 \times 10^4 \]

Addition and Subtraction

Important Rule!

To add or subtract numbers in standard form, the powers of 10 must be the same. If they are different, convert one number so both have the same exponent.

7

Addition Example

Calculate: \( (3.5 \times 10^4) + (2.1 \times 10^3) \)

Solution: First, make the powers the same:

\[ 2.1 \times 10^3 = 0.21 \times 10^4 \]

Now add:

\[ (3.5 \times 10^4) + (0.21 \times 10^4) = (3.5 + 0.21) \times 10^4 = 3.71 \times 10^4 \]

Real-World Applications

World

Scientific Notation in the Real World

Astronomy

Distance to the Sun:

\[ 150,000,000 \text{ km} = 1.5 \times 10^8 \text{ km} \]

Distance to nearest star:

\[ 4 \times 10^{13} \text{ km} \]

Biology

Diameter of a red blood cell:

\[ 0.000007 \text{ m} = 7 \times 10^{-6} \text{ m} \]

Size of a virus:

\[ 1 \times 10^{-7} \text{ m} \]

Chemistry

Avogadro's Number:

\[ 6.02 \times 10^{23} \]

Mass of an electron:

\[ 9.1 \times 10^{-31} \text{ kg} \]

Past Paper Style Questions

CSEC-Style Question 1

(a) Express 0.000345 in standard form. [2 marks]

(b) Express \( 4.7 \times 10^5 \) as an ordinary number. [1 mark]

(c) Calculate \( (2.5 \times 10^3) \times (4 \times 10^{-2}) \), giving your answer in standard form. [2 marks]

Solutions:

(a) \( 0.000345 = 3.45 \times 10^{-4} \)

(b) \( 4.7 \times 10^5 = 470,000 \)

(c) \( (2.5 \times 4) \times 10^{3+(-2)} = 10 \times 10^1 = 1 \times 10^2 \) (or simply \( 10^2 \))

CSEC-Style Question 2

The distance from the Earth to the Moon is approximately \( 3.84 \times 10^5 \) km. Light travels at approximately \( 3 \times 10^5 \) km per second.

(a) How long does it take light to travel from the Moon to the Earth? [2 marks]

(b) Express your answer in standard form. [1 mark]

Solutions:

(a) Time = Distance / Speed

\[ = \frac{3.84 \times 10^5}{3 \times 10^5} = \frac{3.84}{3} \times 10^{5-5} = 1.28 \times 10^0 = 1.28 \text{ seconds} \]

(b) In standard form: \( 1.28 \times 10^0 \) seconds (or simply 1.28 seconds)

CSEC Practice Arena

Test Your Understanding

1
Which of the following is \( 45,000,000 \) written in standard form?
\( 45 \times 10^6 \)
\( 4.5 \times 10^7 \)
\( 4.5 \times 10^6 \)
\( 0.45 \times 10^8 \)
Explanation: The coefficient must be between 1 and 10. Moving the decimal 7 places left gives us \( 4.5 \times 10^7 \). Note that \( 45 \times 10^6 \) is mathematically correct but NOT in proper standard form because 45 is not between 1 and 10.
2
What is \( 0.00082 \) in standard form?
\( 8.2 \times 10^{-3} \)
\( 8.2 \times 10^{-4} \)
\( 82 \times 10^{-5} \)
\( 8.2 \times 10^4 \)
Solution: Move the decimal 4 places to the right to get 8.2. Since the original number is small (less than 1), the exponent is negative: \( 8.2 \times 10^{-4} \).
3
Calculate \( (6 \times 10^5) \div (3 \times 10^2) \)
\( 2 \times 10^7 \)
\( 2 \times 10^3 \)
\( 2 \times 10^{2.5} \)
\( 18 \times 10^3 \)
Solution: Divide coefficients: \( 6 \div 3 = 2 \). Subtract exponents: \( 5 - 2 = 3 \). Answer: \( 2 \times 10^3 \).
4
Express \( 5.6 \times 10^{-3} \) as an ordinary number.
5600
0.56
0.0056
0.00056
Solution: The exponent is -3, so move the decimal 3 places to the left: \( 5.6 \rightarrow 0.0056 \).
5
Which number is the largest?
\( 9.9 \times 10^4 \)
\( 1.1 \times 10^5 \)
\( 2.5 \times 10^5 \)
\( 8.8 \times 10^4 \)
Solution: First compare exponents. \( 10^5 > 10^4 \), so we only need to compare \( 1.1 \times 10^5 \) and \( 2.5 \times 10^5 \). Since \( 2.5 > 1.1 \), the answer is \( 2.5 \times 10^5 = 250,000 \).
Target

CSEC Examination Tips

  • Always check your coefficient: It MUST be between 1 and 10. If your answer is \( 45 \times 10^6 \), convert it to \( 4.5 \times 10^7 \).
  • Watch your signs: Positive exponents = large numbers, Negative exponents = small numbers (decimals).
  • Calculator tip: Use the "EXP" or "EE" button to enter numbers in standard form. \( 3.5 \times 10^8 \) is entered as 3.5 EXP 8.
  • For operations: Remember - multiply: ADD exponents; divide: SUBTRACT exponents.

Summary: Key Points

Standard Form Structure

  • \( A \times 10^n \) where \( 1 \leq A < 10 \)
  • Positive \( n \) = large numbers
  • Negative \( n \) = small numbers

Laws of Indices (for \( 10^n \))

  • \( 10^m \times 10^n = 10^{m+n} \)
  • \( 10^m \div 10^n = 10^{m-n} \)
  • \( (10^m)^n = 10^{m \times n} \)
  • \( 10^{-m} = \frac{1}{10^m} \)
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