Answer:
(2,20)
Step-by-step explanation:
The given function is
[tex]f(x) = 2 \cdot \: {5}^{x} [/tex]
To see which point is not on this curve, we must substitute the points to see which does not satisfy the equation;
For the first point we substitute x=3 and f(x)=250
[tex]250= 2 \cdot \: {5}^{3} \: \\ 250 = 2 \times 125 \\ 250 = 250[/tex]
This is true.
For the second point (2,20), we put x=2 and y=20 to get:
[tex]20= 2 \cdot \: {5}^{2} \\ 20 = 2 \times 25 \\ 20 = 50[/tex]
This is false, hence (2,20) does not lie on this curve.
For (1,10), we have:
[tex]10= 2 \cdot \: {5}^{1} \\ 10 = 10[/tex]
This is also true
Finally for (2,50), we have;
[tex]50= 2 \cdot \: {5}^{2} \\ 50 = 2 \times 25 \\ 50 = 50[/tex]
This is also true.
