Let us learn about log identities
An integer base or number base is the power or exponent to which the base must be raised in order to provide that number is said to be as natural log identities. Real-valued function of a real variable also applied the natural log identities. Inverse function of the exponential function is applying natural logarithm function.
The log identities are written as:
logex or ln x
Where e = 2.71828182846.
The Best Example of log identities
In that case we need to apply the addition law of natural logarithms,
Such as, logeA + logeB = loge (A x B).
1. Solve the log identities problem using natural log identities, given ln(4 x 4) =?
Given problem is here to, ln (4x4)
Log identities for the given problem is, ln (x * y) = (ln x) + (ln y).
ln (4 x 4) = ln4 + ln4
Plug the ln2 and ln4 values in the log identities,
Then add the values,
= 1.386 + 1.386 = 2.772 = (2 x 4) = 2.772.
In our next blog we shall learn about isoelectronic series I hope the above explanation was useful.Keep reading and leave your comments.
An integer base or number base is the power or exponent to which the base must be raised in order to provide that number is said to be as natural log identities. Real-valued function of a real variable also applied the natural log identities. Inverse function of the exponential function is applying natural logarithm function.
The log identities are written as:
logex or ln x
Where e = 2.71828182846.
The Best Example of log identities
In that case we need to apply the addition law of natural logarithms,
Such as, logeA + logeB = loge (A x B).
1. Solve the log identities problem using natural log identities, given ln(4 x 4) =?
Given problem is here to, ln (4x4)
Log identities for the given problem is, ln (x * y) = (ln x) + (ln y).
ln (4 x 4) = ln4 + ln4
Plug the ln2 and ln4 values in the log identities,
Then add the values,
= 1.386 + 1.386 = 2.772 = (2 x 4) = 2.772.
In our next blog we shall learn about isoelectronic series I hope the above explanation was useful.Keep reading and leave your comments.
