<Tr> <Th_colspan="2"> Logarithm (log) </Th> </Tr> <Tr> <Td> log base ⁡ (antilogarithm) = (\ displaystyle \ scriptstyle \ log _ (\ text (base)) ((\ text (antilogarithm))) \, = \,) </Td> <Td> logarithm (\ displaystyle \ scriptstyle (\ text (logarithm))) </Td> </Tr> <P> In mathematics, a product is the result of multiplying, or an expression that identifies factors to be multiplied . Thus, for instance, 6 is the product of 2 and 3 (the result of multiplication), and x ⋅ (2 + x) (\ displaystyle x \ cdot (2 + x)) is the product of x (\ displaystyle x) and (2 + x) (\ displaystyle (2 + x)) (indicating that the two factors should be multiplied together). </P> <P> The order in which real or complex numbers are multiplied has no bearing on the product; this is known as the commutative law of multiplication . When matrices or members of various other associative algebras are multiplied, the product usually depends on the order of the factors . Matrix multiplication, for example, and multiplication in other algebras is in general non-commutative . </P>

How do you find the product in multiplication