$解:(2)②点B的“直角旋转点”M 有两个:$
$点P_{1}和P_{2},作P_{1}H⊥x轴,P_{2}H⊥x轴,$
$垂足分别为H、H$
$∵点A、B的坐标分别为(3,0)、(0,4)$
$∴OA=3,OB=4,∴AB= \sqrt{OA²+OB²}=5$
$∵点P_{1}是点B的“直角旋转点”$
$∴AP=AP_{1}=5,∠BAP_{1}=90°$
$∴∠BAO+∠P_{1}AH_{1}=90°$
$∵∠BOA=90°,∴∠BAO+∠OBA=90°$
$∴∠OBA= ∠P_{1}AH$
$在△ABO 和△P_{1}AH 中$
$\begin{cases}{∠BOA=∠AH_{1}P_{1}}\\{∠OBA=∠P_{1}AH_{1}}\\{AB=P_{1}A}\end{cases}$
$∴△ABO≌△PA H(\mathrm {AAS})$
$∴AH_{1}=OB=4,P_{1}H_{1}=OA=3$
$∴点P_{1}的坐标为(7,3)$
$同理可得点P_{2}的坐标为(-1,-3)$
$设直线1的函数表达式为y=kx+b(k≠0)$
$将A(3,0),P_{1}(7,3)代入,$
$得\begin{cases}{3k+b=0}\\{7k+b=3}\end{cases},解得\begin{cases}{k=\frac {3}{4}}\\{b=\frac {9}{4}}\end{cases}$
$∴y=\frac{3}{4}x-\frac{9}{4}$
$∴点M的坐标为(0,-\frac{9}{4})$
