7. (2025·南京期中)在△ABC中,∠BAC=90°,∠ABC=30°,点P在边BC上.
(1)如图①,当点P是BC的中点时,用直尺和圆规作出△ABC关于点P的对称的三角形(不写作法,保留作图痕迹);
(2)如图②,用直尺和圆规分别作出点P关于AB,AC的对称点P₁,P₂(不写作法,保留作图痕迹).连接AP,若AP=3,则点P₁与点P₂之间的距离为
6
;
(3)如图③,已知∠QPH=40°,将△ABC绕着点P按每秒20°的速度逆时针旋转一周.同时,射线PQ绕着点P按每秒10°的速度顺时针旋转(随△ABC旋转停止而停止),旋转过程中射线PH的位置不变.设旋转时间为t秒,当t为
$\frac{4}{5}$或$2$或$11$或$\frac{76}{5}$
秒时,射线PQ,PB与PH中的某一条射线是另两条射线所夹角的平分线.
答案:7. (1)如图①,$△ A'CB$即为所求.
(2)如图②,点$P_{1}$,$P_{2}$即为所求的点.
6 解析:如图③,$\because P_{1}$,$P_{2}$是点$P$关于$AB$,$AC$的对称点,$\therefore ∠ 1 = ∠ 2$,$∠ 3 = ∠ 4$,$PA = P_{1}A = 3$,$PA = P_{2}A = 3$.$\because ∠ BAC = 90^{\circ}$,即$∠ 2 + ∠ 3 = 90^{\circ}$,$\therefore ∠ 1 + ∠ 4 = 90^{\circ}$,$\therefore ∠ 1 + ∠ 2 + ∠ 3 + ∠ 4 = 180^{\circ}$,即$∠ P_{1}AP_{2} = 180^{\circ}$,$\therefore$点$P_{1}$,$P_{2}$与点$A$在同一条直线上,$\therefore P_{1}P_{2} = P_{1}A + P_{2}A = 3 + 3 = 6$.
(3)$\frac{4}{5}$或$2$或$11$或$\frac{76}{5}$ 解析:如图④,若$PB$平分$∠ QPH$,则$20t = \frac{1}{2}(40 - 10t)$,解得$t = \frac{4}{5}$;
如图⑤,若$PQ$平分$∠ BPH$,则$20t = 2(40 - 10t)$,解得$t = 2$;
如图⑥,若$PQ$平分$∠ BPH$,则$360 - 20t = 2(10t - 40)$,解得$t = 11$;
如图⑦,若$PB$平分$∠ QPH$,则$360 - 20t = \frac{1}{2}(10t - 40)$,解得$t = \frac{76}{5}$;
故$t$的值为$\frac{4}{5}$或$2$或$11$或$\frac{76}{5}$.
