I realise I can edit, but most people don't read those. But anyway, I realised I did the question wrong, so sorry guys.
So attempt no. 2:
4! x 4C1 x 3 x 3C1 x 4 x 2C1 x 5 x 1C1 x 6 = 207 360
4! - Say the styles were P, Q, R, S. I took one shirt of each style and arranged them, this can be done in 4! ways.
4C1 - out of the remaining shirts, I'm choosing one of them ie there will be one left of P, Q, R, S. Each time I use the nCr, I'm choosing one of the remaining shirts.
3 - There are 3 spots for this shirt to be placed. _P_Q_R_S_ Say the shirt chosen (above) is P. P can't be in 2 of the 5 spots (the _ means a spot). Therefore, P can only be in 3 spots. The logic follows that every time a shirt is placed on the rack, the no. spots available is = (no. shirts on rack + 1) - 2
3C1 - choosing one of the 3 remaining shirts
4 - _P
_Q
_R_P_S_ . Only Q, R, S are left. Say Q is chosen, it can't be in the spots marked in red. Same applies to R & S, there are 2 spots on the rack that all shirts can't be in.
2C1 - choosing either R or S. Say R was chosen.
5 - _Q_P_Q
_R
_P_S_ . R can't be in 2 of the spots, marked in red. There are 5 spots left.
1C1 - One shirt left. ie S
6 - _Q_P_R_Q_R_P
_S
_. S can't be in the red spots. Therefore, 6 spots to be placed in.
Someone check if I'm right. I spent ages typing this up.
Actually, answer seems too big. FML if I'm wrong.
