Indices, Surds and Logarithms Notes - Mulberry Education - Indices, Surds and Logarithms...Microsoft...
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263 Tanjong Katong Rd #0107, Tel: 67020118 Indices, Surds and Logarithms Logarithms Common Laws log ! + log ! = log ! () log ! − log ! = log ! log ! ! = log ! log ! = !"# ! ! !"# ! ! (b can take any value) Converting from log from to index Form log ! = ↔ = ! Example: log ! 8 = 3 ↔ 8 = 2 ! Common & Natural logarithms log !" = lg log ! = ln (Use “ln” when there is ; otherwise always use “lg”) Solving Equations 2 Scenarios to reach: 1. A single log on both sides with the same base Example: log ! (2 + 1) = log ! ( − 3) 2 + 1 = − 3 = −3 − 1 2 = −2 2. A single log on one side of the equation Example: log ! 2 + 1 = 2 2 + 1 = 3 ! = 9 − 1 2 = 4 Surds Common Laws × = = × = × = + + = + + + 1 + 1 − = 1 ! − ! = 1 − Rationalising the denominator To remove the surd from the denominator, multiply the entire fraction by the conjugate surd Example: 3 4 − 2 6 = 3 4 − 2 6 × 4 + 2 6 4 + 2 6 = 12 + 6 6 4 ! − 2 6 ! = 6(2 + 6 ) 16 − 4(6) = − 3(2 + 6 ) 4 Simplfying surds Split the surd into a square root of a perfect square times another surd: Examples: 200 = 100 × 2 = 10 2 768 = 256 × 3 = 16 3 125 = 25 × 5 = 5 5 Indices • ! × ! = !!! • ! ÷ ! = !!! • !! = ! ! ! • ! ! ! = ! ! ! ! • ! ! !! = ! ! ! = ! ! ! ! • !! !! ! !! ! = !! ! ! ! ! • ! = 1 • ! ! = • ! ! = ! • ! ! = ! ! • ! × ! = ! Solving by substitution Express the indices into its component powers before doing the substitution Example: By using a suitable substitution, solve the following equation: 3 !!!! + 3 !!! = 1 + 3 ! 3 ! 3 !! + 3 3 ! = 1 + 3 ! 27 3 !! + 2 3 ! − 1 = 0 Let = 3 ! 27 ! + 2 − 1 = 0 = 0.1589 − 0.2330 . ( ) 3 ! = 0.1589 Take “lg” both sides lg 3 = lg 0.1589 = lg 0.1589 lg 3 = 0.4771
Transcript of Indices, Surds and Logarithms Notes - Mulberry Education - Indices, Surds and Logarithms...Microsoft...
263 Tanjong Katong Rd #01-‐07, Tel: 67020118
Indices, Surds and Logarithms
Logarithms Common Laws
log! 𝑏 + log! 𝑐 = log!(𝑏𝑐)
log! 𝑏 − log! 𝑐 = log!𝑏𝑐
log! 𝑏! = 𝑐 log! 𝑏 log! 𝑐 =
!"#! !!"#! !
(b can take any value) Converting from log from to index Form
log! 𝑏 = 𝑐 ↔ 𝑏 = 𝑎! Example:
log! 8 = 3 ↔ 8 = 2! Common & Natural logarithms
log!" 𝑎 = lg 𝑎 log! 𝑎 = ln 𝑎
(Use “ln” when there is 𝑒 ; otherwise always use “lg”) Solving Equations 2 Scenarios to reach: 1. A single log on both sides with the same base Example:
log!(2𝑥 + 1) = log!(𝑥 − 3) 2𝑥 + 1 = 𝑥 − 3
𝑥 =−3 − 12
= −2 2. A single log on one side of the equation Example:
log! 2𝑥 + 1 = 2 2𝑥 + 1 = 3!
𝑥 =9 − 12
= 4
Surds Common Laws
𝑎 × 𝑏 = 𝑎𝑏 𝑎𝑏=
𝑎𝑏
𝑎 × 𝑎 = 𝑎 𝑎 𝑏 ×𝑐 𝑑 = 𝑎𝑐 𝑏𝑑
𝑎 + 𝑏 𝑐 + 𝑑 = 𝑎𝑐 + 𝑎 𝑑 + 𝑐 𝑏 + 𝑏𝑑 1 + 𝑎 1 − 𝑎 = 1! − 𝑎
!= 1 − 𝑎
Rationalising the denominator To remove the surd from the denominator, multiply the entire fraction by the conjugate surd Example:
34 − 2 6
=3
4 − 2 6×4 + 2 64 + 2 6
=12 + 6 6
4! − 2 6!
=6(2 + 6)16 − 4(6)
= −3(2 + 6)
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Simplfying surds Split the surd into a square root of a perfect square times another surd: Examples:
200 = 100 × 2 = 10 2 768 = 256 × 3 = 16 3 125 = 25 × 5 = 5 5
Indices • 𝑎!×𝑎! = 𝑎!!! • 𝑎! ÷ 𝑎! = 𝑎!!! • 𝑎!! = !
!!
• !!
!= !!
!!
• !!
!!= !
!
!= !!
!!
• !!!!
!!!!= !!!
!!!
• 𝑎! = 1 • 𝑎
!! = 𝑎
• 𝑎!! = 𝑎!
• 𝑎!! = 𝑎!!
• 𝑎!×𝑏! = 𝑎𝑏 ! Solving by substitution Express the indices into its component powers before doing the substitution Example: By using a suitable substitution, solve the following equation:
3!!!! + 3!!! = 1 + 3! 3! 3!! + 3 3! = 1 + 3! 27 3!! + 2 3! − 1 = 0
Let 𝑦 = 3! 27𝑦! + 2𝑦 − 1 = 0
𝑦 = 0.1589 𝑜𝑟 − 0.2330 𝑁.𝐴 (𝐸𝑥𝑝𝑜𝑛𝑒𝑛𝑡𝑖𝑎𝑙𝑠 𝑎𝑟𝑒 𝑎𝑙𝑤𝑎𝑦𝑠 𝑝𝑜𝑠𝑖𝑡𝑖𝑣𝑒)
3! = 0.1589 Take “lg” both sides
𝑥 lg 3 = lg 0.1589
𝑥 =lg 0.1589lg 3
= 0.4771
