答案：$\sqrt{2}$

答案：42或32

答案：解:(1)∵大正方形的面积为c²，直角三角形的面积为$\frac{1}{2}$ab,小正方形的面积为(b - a)²，
　∴c² = 4×$\frac{1}{2}$ab + (a - b)² = 2ab + a² - 2ab + b²,
　即c² = a² + b².
　(2)由题意可知,(b - a)² = 2,4×$\frac{1}{2}$ab = 6 - 2 = 4,
　∴ab = 2,∴(a + b)² = (b - a)² + 4ab = 10.

答案：解:(1)在△BCD中,BC = 13,BD = 12,CD = AC - AD = 5,
　∵5² + 12² = 169 = 13²,即CD² + BD² = BC²,
　∴∠BDC = 90°.
　在Rt△ABD中,AD = 16,BD = 12,∠ADB = 90°,
　∴AB = $\sqrt{AD^{2} + BD^{2}}$ = 20.
　又∵点E是边AB的中点,∴DE = $\frac{1}{2}$AB = 10.
　(2)当DE⊥AB时,DE长度最小.
　此时S△ABD = $\frac{1}{2}$AD·BD = $\frac{1}{2}$AB·DE,
　∴DE = $\frac{AD·BD}{AB}$ = $\frac{48}{5}$.
　∴线段DE长度的最小值为$\frac{48}{5}$.

答案：
解:(1)∵△ABC中,∠ACB = 90°,AB = 10,BC = 6,
　∴由勾股定理得AC = $\sqrt{10^{2} - 6^{2}}$ = 8,
　当PA = PB时,PA = PB = t,PC = 8 - t,
　在Rt△PCB中,PC² + CB² = PB²,
　即(8 - t)² + 6² = t²,解得t = $\frac{25}{4}$,
　∴当t = $\frac{25}{4}$时,PA = PB.
　(2)如答图①,当BP = BC = 6时,△BCP为等腰三角形,
　∴AC + CB + BP = 8 + 6 + 6 = 20,
　∴t = 20÷1 = 20;
　如答图②,当CP = CB = 6时,作CD⊥AB于点D,则根据面积法求得CD = 4.8,
　在Rt△BCD中,由勾股定理得,BD = 3.6,
　∴PB = 2BD = 7.2,
　∴CA + CB + BP = 8 + 6 + 7.2 = 21.2,
　此时t = 21.2÷1 = 21.2;
　如答图③,当PC = PB时,作PD⊥BC于点D,作PE⊥AC于点E,则D为BC的中点,可证△APE≌△PBD.
　∴AP = BP = $\frac{1}{2}$AB = 5,
　∴AC + CB + BP = 8 + 6 + 5 = 19,∴t = 19÷1 = 19.
　综上所述,t为20或21.2或19时,△BCP为等腰三角形