Difference between revisions of "Manuals/calci/LOG10"

Latest revision as of 12:52, 3 June 2015

LOG10(Number)

This function gives the logarithm value with the base 10.
The logarithm of x to base b is the solution y to the equation.i.e $b^{y}=x$ .
For e.g The logarithm of 1000 to base 10 is 3. Because 1000 = 10*10*10 = $10^{3}$ .
The logarithm of base 10 is called Common Logarithm or Decimal Logarithm or Decadic Logarithm.
It is denoted by $\log _{10}$ or $log(x)$ .
$\log _{10}(x)$ is related to the number of decimal digits of a positive integer x: the number of digits is the smallest integer strictly bigger than $\log _{10}(x)$ .
For e.g:log(5260)= 3.7209, that is nearly(next digit) to 4.
That is the number of digits of 5260(4).

The syntax is to calculate LOG10 in ZOS is .
- where $Number$ is the any positive real number.
For e.g.,[25..35]@LOG10.
[25..50..3]@LOG10

Log10

@@ Line 13: / Line 13: @@
 *That is the number of digits of 5260(4).
-==ZOS Section==
+==ZOS==
 *The syntax is to calculate LOG10 in ZOS is <math>LOG10(Number)</math>.
 **where <math>Number</math> is the any positive real number.
@@ Line 22: / Line 22: @@
 ==Examples==
-#=log 10(5)= 0.698970004
+#=LOG 10(5)= 0.698970004
-#=log(55)= 1.740362689
+#=LOG (55)= 1.740362689
-#=log(10)= 1
+#=LOG (10)= 1
-#=log(1)= 0
+#=LOG (1)= 0
-#=log(-10)= NaN
+#=LOG (-10)= NaN
-#=log(0.25)= -0.602059991
+#=LOG (0.25)= -0.602059991
+==Related Videos==
+{{#ev:youtube|2Agatf4kYY8|280|center|Logarithm of Base 10}}
 ==See Also==