For handling this kind of quantifiers, you should use the quantifier elimination module available in Z3. Here is an example on how to use it (try online at http://rise4fun.com/Z3/3C3):

```
(assert (forall ((t Int)) (= t 5)))
(check-sat-using (then qe smt))
(reset)
(assert (forall ((t Bool)) (= t true)))
(check-sat-using (then qe smt))
```

The command `check-sat-using`

allows us to specify an strategy to solve the problem. In the example above, I'm just using `qe`

(quantifier elimination) and then invoking a general purpose SMT solver.
Note that, for these examples, `qe`

is sufficient.

Here is a more complicated example, where we really need to combine `qe`

and `smt`

(try online at: http://rise4fun.com/Z3/l3Rl )

```
(declare-const a Int)
(declare-const b Int)
(assert (forall ((t Int)) (=> (<= t a) (< t b))))
(check-sat-using (then qe smt))
(get-model)
```

**EDIT**
Here is the same example using the C/C++ API:

```
void tactic_qe() {
std::cout << "tactic example using quantifier elimination\n";
context c;
// Create a solver using "qe" and "smt" tactics
solver s =
(tactic(c, "qe") &
tactic(c, "smt")).mk_solver();
expr a = c.int_const("a");
expr b = c.int_const("b");
expr x = c.int_const("x");
expr f = implies(x <= a, x < b);
// We have to use the C API directly for creating quantified formulas.
Z3_app vars[] = {(Z3_app) x};
expr qf = to_expr(c, Z3_mk_forall_const(c, 0, 1, vars,
0, 0, // no pattern
f));
std::cout << qf << "\n";
s.add(qf);
std::cout << s.check() << "\n";
std::cout << s.get_model() << "\n";
}
```