The system is:
i) y=-2x+3
ii) [tex]y=-2\cdot3^x[/tex].
Making y's equal, we have:
[tex]-2x+3=-2\cdot3^x[/tex].
Dividing all terms by -2, we have:
[tex]\displaystyle{ x- \frac{3}{2} =3^x[/tex].
Note that [tex]y=x- \frac{3}{2}[/tex] is an increasing linear function. (Its graph is the same as y=x, only shifted 3/2 units down.)
The graph of this function is below the x-axis up to 3/2, where it cuts the x-axis, and then increases above the x-axis making an angle of 45° with the x-axis.
The graph of [tex]y=3^x[/tex] is completely above the x-axis, and it rises much faster than the line. We could compare at 3/2, for example, where the linear function is 0. The exponential function takes the value [tex]3^{\frac{3}{2}}\approx5.2[/tex] and is increasing very fast.
Thus, the graphs never meet, which means the system has no solution.
Answer: no solution.
