1.7+3.98+![]() | ×51 |
5.73-3 +(4.27-2 ) | 45×2.08+1.5×37.6 |
| 99999×77778+33333×66666 | ;![]() |
+ + +…+![]() | + + + + . |
,=1.7+(3.98+0.02),
=1.7+4,
=5.7;
×51,=
(50+1),=
,=47
,=47
;5.73-3
+(4.27-2
),=5.73+4.27-(3
+2
),=10-6,
=4;
45×2.08+1.5×37.6,
=1.5×62.4+1.5×37.6,
=1.5×(62.4+37.6),
=1.5×100,
=150;
99999×77778+33333×66666,
=99999×77778+33333×(3×22222),
=99999×77778+(33333×3)×22222,
=99999×77778+99999×22222,
=99999×(77778+22222),
=99999×100000,
=9999900000;
,=(362+548×361)÷(362×548-186),
=[362+548×(362-1)]÷(362×548-186),
=[362-548+548×362]÷(362×548-186),
=(362×548-186)÷(362×548-186),
=1;
+
+
+…+
,=
×[(1
)+(
)+(
)+…+(
)],=
,=
;
+
+
+
+
,=(1-
)+(
)+(
)+(
)+(
),=1
-
,=1
,=
;分析:1.7+3.98+
,把分数化成小数,再运用加法结合律进行简算;
×51,把51分解为50+1,再运用乘法分配律进行简算;5.73-3
+(4.27-2
),根据加、减法的运算性质进行简算;45×2.08+1.5×37.6,将原式转化为:1.5×62.4+1.5×37.6,再运用乘法分配律进行简算;
99999×77778+33333×66666,将666666改写成3×22222,然后用乘法结合律计算3×33333等于99999,再利用乘法分配律进行简算;
,将原式转化为:(362+548×361)÷(362×548-186)=[362+548×(362-1)]÷(362×548-186),两个括号中的数相同,商就是1.
+
+
+…+
,各分数的分母中的两个数相差3,所以把原式变为原式=
×[(1
)+(
)+(
)+…+(
)],再进行简算;
+
+
+
+
.根据分数拆项方法进行简算;点评:此题考查的目的是灵活运用运算定律、运算性质以及分数的拆项原理和方法进行简便计算.