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LOGARITHM New .pptx
- 1. LOGARITHM
- 2. WHAT IS LOGARITHM????? • A logarithm is the power to which a number must be raised in order to get some other number. • For example, the base ten logarithm of 100 is 2, because ten raised to the power of two is 100: log 100 = 2 because 102 = 100 • The base unit is the number being raised to a power. • There are logarithms using different base units.
- 3. • We can also take 2 as the base unit. • For instance, the base two logarithm of eight is three, because two raised to the power of three equals eight: log2 8 = 3 because 23 = 8
- 4. Base Ten Logarithms • Base ten logarithms are expressions in which the number being raised to a power is ten. The base ten log of 1000 is three: log 1000 = 3 103 = 1000 • A base ten log is written as log and in equation form as log a = r
- 5. Natural Logarithms • Logarithms with a base of 'e' are called natural logarithms. • What is 'e'? • 'e' is a very special number approximately equal to 2.718. 'e' is a little bit like pi in that it is the result of an equation and it's a big long number that never ends. • A natural logarithm is written ln and in equation form as ln a = r
- 6. Relationship between Logarithm and Exponential • Logarithms are the "opposite" of exponentials, just as subtraction is the opposite of addition and division is the opposite of multiplication. • Logs "undo" exponentials or we can say logs are the inverses of exponentials. antilog ax = m …………is equivalent to……….. loga m = x log
- 7. Characteristic and Mantissa • CHARACTERISTIC • It is the integral part of the value • MANTISSA • It is the decimal part of the value
- 8. Laws of Logarithms • Product rule - multiplication becomes addition • Quotient rule - division becomes subtraction • Power rule - exponent becomes multiplier y x xy a a a log log ) ( log y x y x a a a log log log x y x a y a log ) ( log
- 9. Laws of Logarithms • • • • Change of Base Formula • If base is not mentioned, then base will be 10. 1 ) ( log x x 0 1 log a a x x a log 1 log a b b c c a log log log
- 10. In mathematics logarithms were developed for making complicated calculations simple.
- 11. Q: The value of log(.01)(1000) is:
- 12. Q: The logarithm of 0.0625 to the base 2 is:
- 13. Q: If log 8 X= 2/3, then the value of x is :
- 14. Q: If logx y = 100 and log2 x = 10, then the value of y is :
- 15. Q: The value of log 2 (log5 625) is:
- 16. Q: If log 2 [log3 (log 2 X) ] =1, then x is equal to:
- 17. Q: If log10 125 + log10 8 = x, then x is equal to :
- 18. Q: (log5 3) x (log3 625) equals :
- 19. Q: If log12 27 = a, then log6 16 is :
- 20. Q: The value of (log3 4) (log4 5) (log5 6) (log6 7) (log7 8) (log8 9) is:
- 21. Q: If log10 2=0.3010, what is the number of digits in 64 2