We need to find the value of k at which the equation 4(80+n)=(3k)n has no solution.
Let's solve the above equation for n. So,
[tex] 4(80+n)=(3k)n [/tex]
[tex] 320+4n=3kn [/tex] By using the distributing property.
[tex] 320+4n-4n=3kn-4n [/tex] Subtract 4n from each sides.
[tex] 320=3kn-4n [/tex]
[tex] 320=(3k-4)n [/tex] Take out n as a common factor
[tex] \frac{320}{3k-4} =\frac{(3k-4)*n}{3k-n} [/tex] Divide each sides by 3k-4.
[tex] \frac{320}{3k-4} =n [/tex]
So, [tex] n=\frac{320}{3k-4} [/tex]
Denominator of a rational equation cannot be 0 because if it will be 0 then the equation will be undefined and there will be no solution.
Here the denominator is 3k-4. Let's set up 3k-4=0 to get the answer. So,
[tex] 3k-4=0 [/tex]
[tex] 3k-4+4=0+4 [/tex]
[tex] 3k=4 [/tex]
[tex] \frac{3k}{3} =\frac{4}{3} [/tex]
So, [tex] k=\frac{4}{3} [/tex]
So, for [tex] k=\frac{4}{3} [/tex] there will be no solution.
