552/736 = 552 ÷ 8/736 ÷ 8 = 69/92
736 and 21 are comprime so the fraction cannot be reduced.
75% of 736 = 75% * 736 = 0.75 * 736 = 552
736/10
184, 276, 368, 460, 552, 644, 736, 828, +92 . . .
92, 184, 276, 368, 460, 552, 644, 736, 828, 920
7.36 as a fraction = 184/257.36 = 7.36 * 100/100 = 736/100 or 184/25 in fraction in lowest term
The multiples of 184 (which are infinite) are all divisible by 184, including these: 184, 368, 552, 736, 920, 1104, 1288, 1472, 1656 . . .
The first 15 multiples of 92: 92, 184, 276, 368, 460, 552, 644, 736, 828, 920, 1012, 1104, 1196, 1288, 1380 . . . ∞
To determine the number of wondercorn offspring from a heterozygous cross, we need to know the inheritance pattern and the ratio of offspring phenotypes. Assuming wondercorn is a dominant trait and the cross is between two heterozygous individuals (e.g., Aa x Aa), the expected phenotypic ratio would be 3:1 (dominant to recessive). Therefore, out of 736 offspring, approximately 552 would be wondercorn (3/4 of 736).
Add all the scores together and divide by the number of games bowled. Drop the fraction/decimal. 176+220+169+171 = 736 736 / 4 = 184.00 Drop the fraction/decimal (in this case, there isn't any): 184
1, 2, 3, 4, 6, 8, 12, 16, 23, 24, 32, 46, 48, 69, 92, 96, 138, 184, 276, 368, 552, 736, 1104, 2208.
To find what times what equals 736, you can factor 736. One factorization is: 736 = 23 × 32 736=23×32 So, 23 times 32 equals 736. Another factorization is: 736 = 46 × 16 736=46×16 Therefore, 46 times 16 also equals 736. There are other possible factor pairs, but these are two examples.