2. Rewrite the following equation using radicals.
D=0.0099M^(9/10)
M^(1/10) = 10throot(M)
So, M^(9/10) = 10throot(M^9)
what do you mean by root?
you know the square root symbol, yeah?
√16 = 4
similarly,
cuberoot ∛27 = 3
4throot ∜16 = 2
and so on
10throot has no predefined character, but just replace the 4 with a 10
ok thank you
hey oobleck does M=0.0099(10√m^9) work
Yes, if by "10√" you mean 10th root
as you wrote it, however, it means 10*(√m^9)
√ normally means only "square root"
Maybe you could write 10√m^9
To rewrite the equation D = 0.0099M^(9/10) using radicals, we need to express the exponent 9/10 as a radical.
To do this, we can rewrite the exponent 9/10 as a fractional exponent with a denominator of 10. The numerator of the fractional exponent will represent the power, and the denominator will represent the root.
So, 9/10 can be rewritten as (9/10) = 9^(1/10), where the numerator 9 is the power and the denominator 10 is the root.
Now, we can rewrite the equation D = 0.0099M^(9/10) as D = 0.0099M^(9^(1/10)).
This is the equation written using radicals.