Question

How do you solve the equation `sqrtt+sqrt(1+t)-4=0` to find the zeros of the given function?

Answer 1

`t = (15/8)^2`

Explanation:

First we establish the feasible solutions. They must obey:

From `sqrt(t)->t ge 0` and from `sqrt(1+t)->1+t ge 0` so
`t ge 0`

Now grouping

`sqrt(t+1) = 4 - sqrt(t)`

and squaring

`t+1=16-8sqrt(t)+t` simplifying

`8sqrt(t)=15` so

`t = (15/8)^2 > 0`

so the solution is feasible