
Solve Exponential Lesson
Presentation
•
Mathematics
•
7th - 10th Grade
•
Hard
Joseph Anderson
FREE Resource
12 Slides • 13 Questions
1
Exponential Functions and Logarithms
Year 11 Methods
2
Introduction
Exponential growth and decay are found in many practical situations, such as, finance, medicine, chemistry, earthquakes, computing, astronomy, sound, sports and marketing.
Mathematics defines exponential functions as f(x)=kax
where k is a non-zero constant and a is a positive real number other than 1
3
Exponents
Notice that index, power and exponent are interchangeable and that there is a powerful value difference between the operations:
2+4 = 6
2x4=8
2^4=16
4
Understanding Exponents
For more complex problems, you will need to expand the index form to find similar bases.
5
Multiple Choice
12a3b2 in expanded form is:
12×a×a×a×b×b
12×3×2×a×b
6
Multiple Choice
What is the prime factorisation of 24?
2×12
2×2×3
23×3
7
Index Laws
The index laws help simplify expressions and equations.
When using the laws, it is important that you:
- only use them when the bases are the same and
- that you do not multiply/divide, etc the bases.
8
9
10
Multiple Choice
Simplify the following: a0 + a0
a0
2a0
1
2
11
Multiple Choice
12
Multiple Choice
13
Multiple Choice
14
Multiple Choice
Simplify: a3b3a5b10
a8b13
a2b7
a15b30
15
Multiple Choice
16
Multiple Choice
Simplify: b3xb5x×b2x+1
b4x+1
b5x
17
Negative Indices
Using the second index law we can see that a negative indices are equal to the reciprocal with a positive index.
Always state the final answer as a positive index, unless otherwise stated.
18
Negative Index Law
Watch this video for conceptual understanding of the negative index law.
19
20
Multiple Choice
Simplify:
(3ab2)(−2b−3)
−b6a
−b6a2
ab
2b3a
21
Multiple Choice
Which of the following is equivalent to the expression 2x71 ?
(2x)−7
21x7
21x−7
2x−7
22
Multiple Choice
23
Multiple Choice
How else could you write 4−2 ?
16
−16
−161
161
24
Composite Bases
Composite bases can be factorised into primes to simplify the calculations.
Check out the video on prime factorisation to recap!
25
Simplifying using prime factorisation
Consider the folllowing expressions:
43(3×4)3
4333×43
33=27
Exponential Functions and Logarithms
Year 11 Methods
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