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1. 运用乘法公式计算$(m - 2)^2$的结果是( )
A.$m^2 - 4$
B.$m^2 - 2m + 4$
C.$m^2 - 4m + 4$
D.$m^2 + 4m - 4$
A.$m^2 - 4$
B.$m^2 - 2m + 4$
C.$m^2 - 4m + 4$
D.$m^2 + 4m - 4$
答案:
C
2. 运算结果是$x^4y^2 - 2x^2y + 1$的是( )
A.$(-1 + x^2y^2)^2$
B.$(1 + x^2y^2)^2$
C.$(-1 + x^2y)^2$
D.$(-1 - x^2y)^2$
A.$(-1 + x^2y^2)^2$
B.$(1 + x^2y^2)^2$
C.$(-1 + x^2y)^2$
D.$(-1 - x^2y)^2$
答案:
C
3. 将$102^2$变形正确的是( )
A.$102^2 = 100^2 + 2^2$
B.$102^2 = 100^2 - 2×100×2 + 2^2$
C.$102^2 = 100^2 + 4×100 + 2^2$
D.$102^2 = 100^2 + 100×2 + 2^2$
A.$102^2 = 100^2 + 2^2$
B.$102^2 = 100^2 - 2×100×2 + 2^2$
C.$102^2 = 100^2 + 4×100 + 2^2$
D.$102^2 = 100^2 + 100×2 + 2^2$
答案:
C
4. 若$(x + k)^2 = x^2 - 6x + 9$,则$k$的值是____.
答案:
-3
5. 运用完全平方公式计算:
(1)$(5a + 4b)^2$;
(2)$(3x - 2y)^2$;
(3)$(-2m - 1)^2$;
(4)$9.98^2$.
(1)$(5a + 4b)^2$;
(2)$(3x - 2y)^2$;
(3)$(-2m - 1)^2$;
(4)$9.98^2$.
答案:
解(1)原式$=(5a)^{2}+2×5a×4b+(4b)^{2}=25a^{2}+40ab+16b^{2}$.
(2)原式$=(3x)^{2}-2×3x×2y+(2y)^{2}=9x^{2}-12xy+4y^{2}$.
(3)原式$=(-2m)^{2}+2×(-2m)×(-1)+(-1)^{2}=4m^{2}+4m+1$.
(4)原式$=(10-0.02)^{2}$
$=10^{2}-2×10×0.02+0.02^{2}$
$=100-0.4+0.0004=99.6004$.
(2)原式$=(3x)^{2}-2×3x×2y+(2y)^{2}=9x^{2}-12xy+4y^{2}$.
(3)原式$=(-2m)^{2}+2×(-2m)×(-1)+(-1)^{2}=4m^{2}+4m+1$.
(4)原式$=(10-0.02)^{2}$
$=10^{2}-2×10×0.02+0.02^{2}$
$=100-0.4+0.0004=99.6004$.
6. 将四个全等的小长方形如图摆放,恰好形成一个大正方形和中间的一个小正方形,则下列等式中,能准确描述其中所蕴含的几何关系的是( )
A.$a^2 - b^2 = (a - b)(a + b)$
B.$(a - b)^2 = (a + b)^2 - 4ab$
C.$(a + 2b)(a - 2b) = a^2 - 4b^2$
D.$(a + 2b)(a - b) = a^2 + ab - 2b^2$
A.$a^2 - b^2 = (a - b)(a + b)$
B.$(a - b)^2 = (a + b)^2 - 4ab$
C.$(a + 2b)(a - 2b) = a^2 - 4b^2$
D.$(a + 2b)(a - b) = a^2 + ab - 2b^2$
答案:
B
7. 计算下列各题:
(1)$(a - 2b)^2 - (2a + b)(b - 2a) - 4a(a - b)$;
(2)$(2x + 3y)^2 - (4x - 9y)(4x + 9y) + (3x - 2y)^2$.
(1)$(a - 2b)^2 - (2a + b)(b - 2a) - 4a(a - b)$;
(2)$(2x + 3y)^2 - (4x - 9y)(4x + 9y) + (3x - 2y)^2$.
答案:
解(1)原式$=a^{2}-4ab+4b^{2}-b^{2}+4a^{2}-4a^{2}+4ab=a^{2}+3b^{2}$.
(2)原式$=4x^{2}+12xy+9y^{2}-16x^{2}+81y^{2}+9x^{2}-12xy+4y^{2}=-3x^{2}+94y^{2}$.
(2)原式$=4x^{2}+12xy+9y^{2}-16x^{2}+81y^{2}+9x^{2}-12xy+4y^{2}=-3x^{2}+94y^{2}$.
8. (1)已知$(x + y)^2 = 16$,$(x - y)^2 = 4$,求$xy$的值;
(2)若$(a + b)^2 = 13$,$(a - b)^2 = 7$,求$a^2 + b^2和ab$的值.
(2)若$(a + b)^2 = 13$,$(a - b)^2 = 7$,求$a^2 + b^2和ab$的值.
答案:
(1)$\because (x+y)^{2}=16,(x-y)^{2}=4$,
$\therefore x^{2}+2xy+y^{2}=16$,①
$x^{2}-2xy+y^{2}=4$,②
①-②,得$4xy=12$,解得$xy=3$.
(2)$\because (a+b)^{2}=13,(a-b)^{2}=7$,
$\therefore a^{2}+2ab+b^{2}=13$,①
$a^{2}-2ab+b^{2}=7$,②
①+②,得$2a^{2}+2b^{2}=20$,
$\therefore a^{2}+b^{2}=10$.①-②,得$4ab=6$,$\therefore ab=\frac{3}{2}$.
$\therefore x^{2}+2xy+y^{2}=16$,①
$x^{2}-2xy+y^{2}=4$,②
①-②,得$4xy=12$,解得$xy=3$.
(2)$\because (a+b)^{2}=13,(a-b)^{2}=7$,
$\therefore a^{2}+2ab+b^{2}=13$,①
$a^{2}-2ab+b^{2}=7$,②
①+②,得$2a^{2}+2b^{2}=20$,
$\therefore a^{2}+b^{2}=10$.①-②,得$4ab=6$,$\therefore ab=\frac{3}{2}$.
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