Operations with Standard Form (OCR GCSE Maths) : Revision Note

Written by: Jamie Wood

Reviewed by: Dan Finlay

Updated on 17 October 2024

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Operations with Standard Form

How do I perform calculations in standard form using a calculator?

Make use of brackets around each number, and use the $\times 10^{x}$ button to enter numbers in standard form
- e.g. $(3 \times 10^{8}) \times (2 \times 10^{- 3})$
- You can instead use the standard multiplication and index buttons
If your calculator answer is not in standard form, but the question requires it:
- Either rewrite it using the standard process
  - e.g. 3 820 000 = 3.82 × 10⁶
- Or rewrite numbers in standard form, then apply the laws of indices
  - e.g. 243 × 10²⁰ = (2.43 × 10²) × 10²⁰ = 2.43 × 10²²

How do I perform calculations with numbers in standard form without a calculator?

Multiplication and division

Consider the "number parts" separately to the powers of 10
- E.g. $(3 \times 10^{2}) \times (4 \times 10^{5})$
  - Can be written as $(3 \times 4) \times (10^{2} \times 10^{5})$
- Then calculate each part separately
  - Use laws of indices when combining the powers of 10
  - $12 \times 10^{7}$
- This can then be rewritten in standard form
  - $1.2 \times 10 \times 10^{7}$ $= 1.2 \times 10^{8}$
This process is the same for a division
- E.g. $(8 \times 10^{- 5}) \div (2 \times 10^{- 3})$
  - Can be written as $\frac{8 \times 10^{- 5}}{2 \times 10^{- 3}} = \frac{8}{2} \times \frac{10^{- 5}}{10^{- 3}}$
- Then calculate each part separately
  - Use laws of indices when combining the powers of 10
  - Be careful with negative powers -5 -(-3) is -5 + 3
  - $4 \times 10^{- 2}$

Addition and subtraction

One strategy is to write both numbers in full, rather than standard form, and then add or subtract them
- E.g. $(3.2 \times 10^{3}) + (2.1 \times 10^{2})$
- Can be written as $3200 + 210 = 3410$
- Then this can be rewritten in standard form if needed, $3.41 \times 10^{3}$
However this method is not efficient for very large or very small powers
For very large or very small powers:
- Write the values with the same, highest, power of 10
- And then calculate the addition or subtraction, keeping the power of 10 the same
- Consider $(4 \times 10^{50}) + (2 \times 10^{48})$
  - Rewrite both with the highest power of 10, i.e. 50
  - Changing 10⁴⁸ to 10⁵⁰ has made it 10² times larger, so make the 2 smaller by a factor of 10² to compensate
  - $(4 \times 10^{50}) + (0.02 \times 10^{50})$
  - These can now be added
  - $4.02 \times 10^{50}$
- Consider $(8 \times 10^{- 20}) - (5 \times 10^{- 21})$
  - Rewrite both with the higher power of 10, i.e. -20
  - Changing 10^-21 to 10^-20 has made it 10¹ times larger, so make the five 10¹ times smaller to compensate
  - $(8 \times 10^{- 20}) - (0.5 \times 10^{- 20})$
  - These can now be subtracted
  - $7.5 \times 10^{- 20}$

Worked Example

Without using a calculator, find $(45 \times 10^{- 3}) \div (0.9 \times 10^{5})$ .

Write your answer in the form $A \times 10^{n}$ , where $1 \leq A < 10$ and $n$ is an integer.

Rewrite the division as a fraction, then separate out the powers of 10

$\frac{45 \times 10^{- 3}}{0.9 \times 10^{5}} = \frac{45}{0.9} \times \frac{10^{- 3}}{10^{5}}$

Work out $\frac{45}{0.9}$

$\frac{45}{0.9} = \frac{450}{9} = 50$

Work out $\frac{10^{- 3}}{10^{5}}$ using laws of indices

$\frac{10^{- 3}}{10^{5}} = 10^{- 3 - 5} = 10^{- 8}$

Combine back together

$(45 \times 10^{- 3}) \div (0.9 \times 10^{5}) = 50 \times 10^{- 8}$

Rewrite in standard form, where $a$ is between 1 and 10

$50 \times 10^{- 8} = 5 \times 10 \times 10^{- 8} = 5 \times 10^{- 7}$

$5 \times 10^{- 7}$

Worked Example

Without using a calculator, find $(2.8 \times 10^{- 6}) + (9.7 \times 10^{- 8})$ .

Write your answer in the form $A \times 10^{n}$ , where $1 \leq A < 10$ and $n$ is an integer.

Rewrite both numbers with the highest power of ten, which is -6

Changing 10^-8 to 10^-6 has made it 10² times larger, so make the 9.7 a factor of 10² times smaller to compensate

$(2.8 \times 10^{- 6}) + (0.097 \times 10^{- 6})$

The numbers can now be added together, keeping the power of 10 the same

$2.897 \times 10^{- 6}$

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1. Number Operations & Integers

Number Operations

Mathematical Symbols

Order of Operations (BIDMAS/BODMAS)

Irrational Numbers

Negative Numbers

Addition & Subtraction

Multiplication & Division

Related Calculations

Money Calculations

Systematic Lists

Product Rule for Counting

Prime Factors, HCF & LCM

Types of Number

Prime Factor Decomposition

Uses of Prime Factor Decomposition

HCF & LCM

2. Fractions, Decimals & Percentages

Fractions

Basic Fractions

Mixed Numbers & Improper Fractions

Adding & Subtracting Fractions

Multiplying & Dividing Fractions

Percentages

Basic Percentages

Percentage Increases & Decreases

Reverse Percentages

Fractions, Decimals & Percentages

Converting Fractions, Decimals & Percentages

Recurring Decimals

Ordering Fractions, Decimals & Percentages

3. Indices & Surds

Powers, Roots & Standard Form

Powers & Roots

Laws of Indices

Converting to & from Standard Form

Operations with Standard Form

Surds

Simplifying Surds

Rationalising Denominators

4. Approximation & Estimation

Rounding, Estimation & Bounds

Rounding & Estimation

Upper & Lower Bounds

Using a Calculator

Using a Calculator

5. Ratio, Proportion & Rates of Change

Ratios

Introduction to Ratios

Sharing in a Ratio

Working with Proportion

Problem Solving with Ratios

Ratios with Fractions, Decimals & Percentages

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Exchange Rates & Best Buys

Exchange Rates

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Simple Interest

Compound Interest

Depreciation

Exponential Growth & Decay

6. Algebra

Introduction to Algebra

Algebraic Notation

Algebraic Vocabulary

Substitution

Collecting Like Terms

Algebraic Roots & Indices

Algebraic Roots & Indices

Expanding Brackets

Expanding & Simplifying Single Brackets

Expanding Double Brackets

Expanding Triple Brackets

Factorising

Factorising Out Terms

Factorising by Grouping