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Download Solving Exponential Functions: Common Base
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Logarithmic Functions Todayβs Objective: I can write and evaluate logarithmic expressions. 4 different ways 64 = 641 = 82 = 43 = 26 5 different ways 4096 = 40961 = 642 = 163 = 84 = 46 = 212 7 different ways 16,777,216 = 167772161 = 40962 = 2563 = 644 = 166 = 88 = 412 = 224 Solving exponential equations using common bases 5π₯ = 125 Write each side with the same base. π₯ 5 =5 3 Since bases are the same exponents must be equal. π₯=3 1 π₯ 4 = 16 4π₯ = 1 4 2 4π₯ = 4 β2 π₯ = β2 4π₯ = 32 22π₯ = 25 2π₯ = 5 5 π₯= 2 2π₯ = 7 Exponential & Logarithm Equations Exponential Equation aο½b Logarithm Equation Exponent/power Inverse x logb a ο½ x π logπ π = π log π π π = π Base Result Read: log base b of a Common Log: Logs with a base 10 Written log only β no base # needed Calculator button: [LOG] π= Write in logarithmic form 14 = 5π₯ 23 = π π₯ π π₯ β log π π = π₯ log 5 14 14 = π₯ log π 23 = π₯ 6 = 103π₯+1 log10 6 = 3π₯ + 1 log 6 = 3π₯ + 1 Write in exponential form π₯ π₯ 3 = log 3 8 = π₯ 3 8 52π₯ = 34 log 5 34 = 2π₯ log 8 (6) + 1 = π₯ log 8 6 = π₯ β 1 8π₯β1 = 6 Solve each equation by using common base method π₯ = log 5 625 5π₯ = 625 5π₯ = 5 4 π₯=4 π = π π₯ β log π π = π₯ log 3 27 = π₯ β 7 3π₯β7 = 27 3 π₯β7 =3 3 π₯β7=3 π₯ = 10 log 4 64 = 2π₯ + 3 42π₯+3 = 64 42π₯+3 3 =4 2π₯ + 3 = 3 π₯=0
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