all+of+a+sudden翻译
@莫厚1100:1、编写程序,求 Sn=a+aa+aaa+...+aaaa...aaa(n个a)的值,其中a是一个数字, 例如,a=2, n=5时,Sn=2+22 -
姚灵18632503851…… #include main() { int n; long a, sum = 0; printf("please input a and n, and press Enter to continue\n"); scanf("%ld%d", &a, &n);//输入a和n的值 while(n) { sum += a; a += 10 * a; n--; } printf("sum = %ld\n", sum); }
@莫厚1100:代数化简法化简Y=AB+AC+A非B+B非C -
姚灵18632503851…… 1.Y=AB+AC+A非B+B非C =AB+A非B+AC+B非C =B+B非C+AC =B+AC 2.Y=AB+A非C+BC非 =B(A+C非)+A非C =B+A非C 3.Y=(ABC)非+A+B+C =U 4.Y=A非B+AC非+BC =B(A非+C)+AC非 =B+AC非
@莫厚1100:已知abc=1,求(ab+a+1分之1)+(bc+b+1分之1)+(ac+c+1分之1) -
姚灵18632503851…… =1 1/(AB+A+1)=C/(1+AC+C)1/(BC+B+1)=AC/(C+1+AC) 原式=(A+AC+1)/(1+AC+1)=1
@莫厚1100:已知A△B=(A+B)+A除以B求(2△1) △2.5 -
姚灵18632503851…… (一) A△B=(A+B)+A/B (2△1) △2.5= { (2+1)+2/1} △2.5= 5△2.5=(5+2.5)+5/2.5=7.5+2=9.5 (二) A△B=【(A+B)+A】/B (2△1) △2.5= { 【(2+1)+2】/1} △2.5= 5△2.5=【(5+2.5)+5】/2.5=12.5/2.5=5
@莫厚1100:a bit of+不定冠词+名词 例如:I'm afraid your friend is a bit of a thief. - 作业帮
姚灵18632503851…… [答案] 有几分是.
@莫厚1100:1. 一个最小项之和表达式的例子是 A. A'B+AB'C+ABD' B. AB'C+AC...
姚灵18632503851…… abc+bc+ca+ab+a+b+c+1 =bc(a+1)+ca+a+ab+b+c+1 =bc(a+1)+a(c+1)+b(a+1)+(c+1) =(a+1)(b+bc)+(c+1)(a+1) =b(a+1)(c+1)+(c+1)(a+1) =(a+1)(c+1)(b+1) =(a+1)(b+1)(c+1)
@莫厚1100:若a,b,c>0,且a^2+ab+ac+bc=4,则2a+b+c的最小值为 -
姚灵18632503851…… a^2+ab+ac+bc=4 (a+c)(a+b)=4 2a+b+c=a+c+a+b ≥2√(a+c)(a+b)=2*2=4 所以最小值为4
@莫厚1100:abc=1,求证: 1/ab+a+1 +1/bc+b+1 +1/ca+c+1 =1 -
姚灵18632503851…… 给你一个清晰的过程:解: 1/(ab+a+1)+1/(bc+b+1)+1/(ca+c+1) =abc/(ab+a+abc)+1/(bc+b+1)+1/(ca+c+1)······第一项的分子分母的1用abc代替; =bc/(b+1+bc)+1/(bc+b+1)+1/(ca+c+1) =(bc+1)/(bc+b+1)+1/(ca+c+1) =(bc+abc)/(bc+b+abc)+1/(ca+c+1))······第一项的分子分母的1用abc代替; =(c+ca)/(c+1+ca)+1/(ca+c+1) =(ca+c+1)/(ca+c+1) =1
姚灵18632503851…… #include main() { int n; long a, sum = 0; printf("please input a and n, and press Enter to continue\n"); scanf("%ld%d", &a, &n);//输入a和n的值 while(n) { sum += a; a += 10 * a; n--; } printf("sum = %ld\n", sum); }
@莫厚1100:代数化简法化简Y=AB+AC+A非B+B非C -
姚灵18632503851…… 1.Y=AB+AC+A非B+B非C =AB+A非B+AC+B非C =B+B非C+AC =B+AC 2.Y=AB+A非C+BC非 =B(A+C非)+A非C =B+A非C 3.Y=(ABC)非+A+B+C =U 4.Y=A非B+AC非+BC =B(A非+C)+AC非 =B+AC非
@莫厚1100:已知abc=1,求(ab+a+1分之1)+(bc+b+1分之1)+(ac+c+1分之1) -
姚灵18632503851…… =1 1/(AB+A+1)=C/(1+AC+C)1/(BC+B+1)=AC/(C+1+AC) 原式=(A+AC+1)/(1+AC+1)=1
@莫厚1100:已知A△B=(A+B)+A除以B求(2△1) △2.5 -
姚灵18632503851…… (一) A△B=(A+B)+A/B (2△1) △2.5= { (2+1)+2/1} △2.5= 5△2.5=(5+2.5)+5/2.5=7.5+2=9.5 (二) A△B=【(A+B)+A】/B (2△1) △2.5= { 【(2+1)+2】/1} △2.5= 5△2.5=【(5+2.5)+5】/2.5=12.5/2.5=5
@莫厚1100:a bit of+不定冠词+名词 例如:I'm afraid your friend is a bit of a thief. - 作业帮
姚灵18632503851…… [答案] 有几分是.
@莫厚1100:1. 一个最小项之和表达式的例子是 A. A'B+AB'C+ABD' B. AB'C+AC...
姚灵18632503851…… abc+bc+ca+ab+a+b+c+1 =bc(a+1)+ca+a+ab+b+c+1 =bc(a+1)+a(c+1)+b(a+1)+(c+1) =(a+1)(b+bc)+(c+1)(a+1) =b(a+1)(c+1)+(c+1)(a+1) =(a+1)(c+1)(b+1) =(a+1)(b+1)(c+1)
@莫厚1100:若a,b,c>0,且a^2+ab+ac+bc=4,则2a+b+c的最小值为 -
姚灵18632503851…… a^2+ab+ac+bc=4 (a+c)(a+b)=4 2a+b+c=a+c+a+b ≥2√(a+c)(a+b)=2*2=4 所以最小值为4
@莫厚1100:abc=1,求证: 1/ab+a+1 +1/bc+b+1 +1/ca+c+1 =1 -
姚灵18632503851…… 给你一个清晰的过程:解: 1/(ab+a+1)+1/(bc+b+1)+1/(ca+c+1) =abc/(ab+a+abc)+1/(bc+b+1)+1/(ca+c+1)······第一项的分子分母的1用abc代替; =bc/(b+1+bc)+1/(bc+b+1)+1/(ca+c+1) =(bc+1)/(bc+b+1)+1/(ca+c+1) =(bc+abc)/(bc+b+abc)+1/(ca+c+1))······第一项的分子分母的1用abc代替; =(c+ca)/(c+1+ca)+1/(ca+c+1) =(ca+c+1)/(ca+c+1) =1
