" If "(27)^(999)" is divided by "7," then the reminder is "

If (27)^(999) is divided by 7, then the remainder is

If (27)^999 is divided by 7, then the remainder is .

If 11,109,999 is divided by 1111 ,then what is the remainder? 1098quad (b)1010quad (c)1110 (d) 1188

When positive numbers x, y and z are divided by 31, the reminders are 17, 24 and 27 respectively. When (4x - 2y + 3z) is divided by 31, the reminder will be: जब सकारात्मक संख्या x, y और z को 31 से विभाजित किया जाता है, तो शेषफल क्रमशः 17, 24 और 27 होते हैं। जब (4x - 2y + 3z) को 31 से विभाजित किया जाता है, तो शेषफल क्या होगा |

If (11)^(27)+(21)^(27) when divided by 16 leaves the remainder

(27^27+1) when divided by 26 would leave a remainder of:

Find the ratio in which the line segment joining the points A(3,-3) and B(-2,7) is divided by x-axis.Also,find the coordinates of the point of division.

Divide each of the number by 10 and note down the remainder.Then,compare the remainder with the ones digit of the numer.(we do the first one for you ,when we divide 27 by 10 , we get a remainder of 7.) .e.27=(2 xx 10)+7 27 -:10 = 2 ,remainder 7. M We see that the remainde is the same as the ones digit of 27.