A logarithmic equation is solved by using properties of log and for a particular value of the function.
A logarithmic inequality is can be solved for all x values that satisfy the inequality.
We have to determine, the difference between solving logarithmic inequality and logarithmic equation.
According to the question,
Logarithmic equation; A logarithmic is an equation that involves the logarithmic of an expression containing a variable.
The logarithmic equation is a relation between two variables x and y by using the logarithmic properties to solve the equation for the required value.
Logarithmic inequality; A logarithmic equation or inequality can be solved for all x values that satisfy the equation or inequality.
Logarithmic inequalities are inequalities in which one (or both) sides involve a logarithm.
Like exponential inequalities, they are useful in analyzing situations involving repeated multiplication, such as in the cases of interest and exponential decay.
These are the steps are used to solve logarithmic inequality,
- Step1; Eliminate fractions by multiplying all terms by the least common denominator of all fractions.
- Step2; Simplify by combining like terms on each side of the inequality.
- Step3; Add or subtract quantities to obtain the unknown on one side and the numbers on the other.
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https://brainly.com/question/3072484
