Suppose that a give a remainder of 22 when divided by 42;a gives 13 and a remainder r when divisible by 14
Giải hộ mình nhé Luân Đào
Suppose that a give a remainder of 22 when divided by 42;a gives 13 and a remainder r when divisible by 14
Giải hộ mình nhé Luân Đào
Suppose f(x) is a polynomial of x.If f(x) has a remainder of 3 when it is divided by 2(x-1) and 2f(x) has a remainder of -4 when it is divided by 3(x+2).Thus when 3f(x) is divided by 4(\(x^2+x-2\)),the remainder is ax+b,where a and b are constants.Then a+b=...............
Find the remainder when 3810 divided by 13
When 9^10^11-5^9^10 is divided by 13, the remainder is
Write 19951995 as a sum of natural number. The remainder when we divide the sum of the cubes of those natural numbers by 6 is
Given that A=1^n+2^n+.....+98^n, where n is an odd possitive number. Fine the remainder in the division of A by 5
Suppose \(\overline{ab}\) is a 2 digit number with the property that the 6 digit number \(\overline{1234ab}\) is divisible by 9 and \(\overline{ab1234}\) is divisible by 11. What is a2 - b2
given that a^2-b^2 =1 evaluate A=2(a^6-a^6)-3(a^4+a^4)
find the remainder in the division ò x^30+x^4-x^1975+1 by x-1
give that \(x^4+ax+b\) is divisible by \(x^2-4\) . find the value of a +b
Câu 1 : the remainder in the division of \(\left(x^3-25x+1\right)by\left(x+4\right)\)
Câu 2 : the remainder in the division of \(\left(x^3-3x-16\right)by\left(x-4\right)\)