$$H = {{{u^2}{{\sin }^2}(45^\circ )} \over {2g}} = 120$$ m

$$ \Rightarrow {{{u^2}} \over {4g}} = 120$$ m

If speed is v after the first collision, then speed should remain $${1 \over {\sqrt 2 }}$$ times, because kinetic energy has reduced to half.

$$ \Rightarrow v = {u \over {\sqrt 2 }}$$

$$ \Rightarrow {h_{\max }} = {{{v^2}{{\sin }^2}(30^\circ )} \over {2g}}$$

$$ \Rightarrow {h_{\max }} = {{{{\left( {{u \over {\sqrt 2 }}} \right)}^2}{{\sin }^2}(30^\circ )} \over {2g}}$$

$$ \Rightarrow {h_{\max }} = \left( {{{{u^2}/4g} \over 4}} \right) = {{120} \over 4}$$

$$ \Rightarrow {h_{\max }} = 30$$ m