solve for the unknown:
6e^(-4t) = 2
how do you do the following without a calculator:
3 x 4^(1/4) - 12 x 2^(-3/2)
4 answers
ahh sorry that was supposed to be a separate question.
note that you can combine exponents if they have the same base. thus, we change the 4 (first term) to 2^2 since the base on the second term is equal to 2:
3 x 4^(1/4) - 12 x 2^(-3/2)
3 x (2^2)^(1/4) - 12 x 2^(-3/2)
also, since 12 = 2*2*3 = (2^2)*3,
3 x (2^2)^(1/4) - (3*2^2) x 2^(-3/2)
3 x 2^(1/2) - 3 x (2^2) x (2^(-3/2))
note that to multiply exponents, first they must have the same base, and then you can add their exponents. thus, for the second term, we just add the exponents of 2:
3 x 2^(1/2) - 3 x (2^2) x (2^(-3/2))
3 x 2^(1/2) - 3 x (2^(2 - 3/2))
3 x 2^(1/2) - 3 x 2^(1/2)
0
hope this helps~ :)
3 x 4^(1/4) - 12 x 2^(-3/2)
3 x (2^2)^(1/4) - 12 x 2^(-3/2)
also, since 12 = 2*2*3 = (2^2)*3,
3 x (2^2)^(1/4) - (3*2^2) x 2^(-3/2)
3 x 2^(1/2) - 3 x (2^2) x (2^(-3/2))
note that to multiply exponents, first they must have the same base, and then you can add their exponents. thus, for the second term, we just add the exponents of 2:
3 x 2^(1/2) - 3 x (2^2) x (2^(-3/2))
3 x 2^(1/2) - 3 x (2^(2 - 3/2))
3 x 2^(1/2) - 3 x 2^(1/2)
0
hope this helps~ :)
thank you! :]
1 answer