□ 41 次の等式を証明せよ。 *(1) (2) (3a-46) (3ã+46)=9|a|²-16/6/² (þ−ã)·(þ+26)=³²-(a−26)•p-2à·b *(3) |2a+36|²=4|a|²+12à·6+9|61|²

41 (1) 左辺=(2a+3)(2a+3) = 2a (2a+36) +36 (2a+36) = 2a-2a+2a.36+36-2a+36.36 = 4a|²+6à.6+6à·6+9|6|² =4|a|°+12.1 +9|3|2 =右辺 よって |2a+36|2=4|a|2+ 12.1+ 9|6|2 (2) £=3ả·(3ã+4b ) − 4b · (3a + 4b ) = 3a.3a+3a-46-46.3a-46.46 =9|a|²+12a-6-12a-6-16|6|² = 9|4|2-16|8|2 = 右辺 8 A# よって (34) (3a+48)=9|a|2-16||2 (3) £=p⋅(p+26) — à · (p+26) → = p.p+p•2b-a·p-a. 26 =|p|² +2b · p− à · p-2a-6 =p2-(a-26)-20.1=右辺 よって p-a). (p+26) = |b|² - (a-26)-7-2a-b 煜,応用問題

41.(1) 12g+3=41+12お喜+9/30 (左辺)=(2 +3号)、(28+3) → = 42-2 + Þ2₂.7 + 97 - Z 4/2 1² + 1/2 2 6 + 9 / 7²1² = (7011) ( ² ) ( 3 2 -4 7 ) ( ³2² +47) = 9₁/2² | ² - 16/7/² (72) = (32-47)· (32 +47) = 92 · 2² - 167² - f =の間-16 =(右) (3) (P-a) · (P + ² 6 ) = ( PI - (a-26 ) · P-za-Ĝ (FI) = P²· P-(a-26). P-20-7 (左)= - [PI²-(a-26)-P-2a-7 = (7)