\displaystyle{c}={6},{d}={0} Explanation: \displaystyle{9}{c}+{2}{d}={54}-----{\left({1}\right)} \displaystyle{c}+{2}{d}={6}------{\left({2}\right)} \displaystyle\therefore{\left({1}\right)}-{\left({2}\right)} ...

see explanation. Explanation: Given \displaystyle{A}{B}={D}={6},\Rightarrow{A}{G}=\frac{{D}}{{2}}={3} Given \displaystyle{r}={3} \displaystyle\Rightarrow{h}=\sqrt{{{r}^{{2}}-{\left(\frac{{D}}{{2}}\right)}^{{2}}}}=\sqrt{{{16}-{9}}}=\sqrt{{7}} ...

Hint: use a coordinate system centered at B such that: A=(0,8)\quad D=(0,6) \quad E=(8,0) \quad C=(10,0) and F is the intersection point of the two lines: \frac{x}{8}+\frac{y}{8}=1 \qquad\frac{x}{10}+\frac{y}{6}=1 ...

By law of sines for \Delta CFB we obtain: BF=AC\cdot\sin45^{\circ}=\sqrt{6^2+8^2}\sin45^{\circ}=5\sqrt2.

Your value for t is correct, but in the second equation you added, instead of subtracted, the acceleration. Remember, gravity is a downward acceleration. Simple arithmetic error.

Rotate \triangle ADC w.r.t. A so that AC overlaps AB. Suppose image of D is E. Now AE=AD=ED=6 for \angle EAD=\pi/3 . Now in \triangle BED, BE=8, ED=6 ,BD=10 so \triangle BED is ...