log base m of x = y is equivalent to x=m^y
Log Frame stands for Logical Framework
the log of a number, X, is equal to some value , N, and by definition 10 to the N power =X 10 to any power is always positive
log(2) + log(4) = log(2x)log(2 times 4) = log(2x)2 times 4 = 2 times 'x'x = 4
how do i log in
log(5)125 = log(5) 5^(3) = 3log(5) 5 = 3 (1) = 3 Remember for any log base if the coefficient is the same as the base then the answer is '1' Hence log(10)10 = 1 log(a) a = 1 et.seq., You can convert the log base '5' , to log base '10' for ease of the calculator. Log(5)125 = log(10)125/log(10)5 Hence log(5)125 = log(10) 5^(3) / log(10)5 => log(5)125 = 3log(10)5 / log(10)5 Cancel down by 'log(10)5'. Hence log(5)125 = 3 NB one of the factors of 'log' is log(a) a^(n) The index number of 'n' can be moved to be a coefficient of the 'log'. Hence log(a) a^(n) = n*log(a)a Hope that helps!!!!!
Log Frame stands for Logical Framework
the definition of log N = X is 10 to the X power =N for log 0 we have 10 to the x power = 0 The solution for x is that x is very large (infinite) and negative, that is, minus infinity As N gets smaller and smaller, log N approaches minus infinity log 1 = 0 log .1 = -1 log .001 = -3 log .000001 = -6 log 0 = -infinity
pH is equal to the negative log of the concenetration of hydrogen ions in a solution. More simply, pH=-log[H+]. The hydrogen ion concentration is in moles/liter.
a writtin log of how one character's feelings influence the story and other characters
The definition of logmein free is that it is a series of words that were put together to form a word that is made up. Log me in is the correct separation of the made up word.
The pH level is defined as the log of hydrogen ion concentration. It is a measure of acidity of a solution.
the log of a number, X, is equal to some value , N, and by definition 10 to the N power =X 10 to any power is always positive
pH is a measure of the concentration of hydrogen ions in a solution. It is defined as the negative logarithm (base 10) of the hydrogen ion concentration in moles per liter. Mathematically, pH = -log[H+].
One way to prove that log n is o(n) is by using the definition of big O notation. In this case, you can show that for all n greater than a certain value, log n is always less than some constant times n. This can be demonstrated through mathematical manipulation and analysis of the growth rates of log n and n.
Same as saying [H3O+] = 1.0 X 10-13 M.pH = (by definition) -log[H3O+] = -log(1.0 X 10-13) = 13.0So pH = 13
tom dunsdons dad and mum log log log log log log log in my buttt
log(x6) = log(x) + log(6) = 0.7782*log(x) log(x6) = 6*log(x)