Answer:
The height of the pole is 105ft,
Step-by-step explanation:
Let us call [tex]h[/tex] the height of the pole, then we know that the distance from the bottom of the pole to the anchor point is 49, or it is [tex]h - 49[/tex].
The wire length [tex]d[/tex] is 14 ft longer than height [tex]h[/tex], hence
[tex]d= h+14[/tex].
Thus we get a right triangle with hypotenuse [tex]d= y+14[/tex], perpendicular [tex]h[/tex], and base [tex]h-49[/tex]; therefore, the Pythagorean theorem gives
[tex](h-49)^2+h^2 = (h+14)^2[/tex]
which upon expanding we get:
[tex]h^2-98h+2401 = h^2+28h+196[/tex]
further simplification gives
[tex]h^2-126h+2205=0[/tex],
which is a quadratic equation with solutions
[tex]h =21ft\\h = 105ft.[/tex]
Since the first solution [tex]h =21ft[/tex] will give the triangle base length of [tex]21ft-49ft = -28ft[/tex] which is negative; therefore, we disregard it and pick the solution [tex]h = 105ft[/tex].
Hence, the height of the pole is 105ft.
