=(0.01+0.09)+(0.02+0.08)+(0.03+0.07)+(0.04+0.06)+0.05
=0.4+0.05
=0.45本回答被提问者和网友采纳
0.01+0.02+0.03+0.04+0.05+0.06+.+0.09等于多少
=(0.01+0.09)+(0.02+0.08)+(0.03+0.07)+(0.04+0.06)+0.05 =0.4+0.05 =0.45
计算:0.01+0.02+0.03+0.04+0.05+0.06+0.07+0.08…
0.01+0.03+0.05+0.07+.+0.97+0.99 解 原式 =(0.01+0.99)×99÷2 =1×99÷2 =49.5
0.01+0.02+0.03+0.04+0.05+0.06+0.07……+0.99=多少
0.01+0.02+0.03+0.04+0.05+0.06+0.07……+0.99 =(0.01+0.99)x99÷2 =1x49.5 =49.5
0.01+0.02+0.03+0.04+0.05+...+0.09+0.11+...+0.97+0.99简便算法
(100*(0.01+0.09))\/2 或者 100*0.01+(100(100-1)*0.01)\/2
0.01+0.02+0.03+0.04+……+0.99的计算方法
0\/.000.0.0.00.
0.01+ 0.02 +0.03 +0.04 +0.05+ 0.06 +... 0.94+ 0.95+ 0.96 +0.97...
这与1加到99的问题是一样的.0与0.99,0.01与0.98…共50组,所以答案为0.99x50=49.5
0.01+0.02+0.03+0.04+···+0.99 解题思路
等差数列 =(0.01+0.99)X99÷2 =49.5
0.01+0.02+0.03+0.04+0.05+0.06+0.07+0.08+0.09+0.10
等差数列前n项和S=na1+n(n-1)d\/2
0.01+0.02+0.03+0.04+……+0.99的计算方法
0.01+0.02+0.03+0.04+……+0.99 =(0.01+0.99)*99\/2 =49.5
将“0.01+0.02+0.03+0.04+0.05……+0.19+0.2”改写成乘法算式,并计算出...
原式=0.01*(1+2+3+4+5+···+19+20)=0.01*[(1+20)\/2*20]=0.01*210 =2.1
