1/c also that depends on the value of c
The remainder is 0.If A has a remainder of 1 when divided by 3, then A = 3m + 1 for some integer mIf B has a remainder of 2 when divided by 3, then B = 3n + 1 for some integer n→ A + B = (3m + 1) + (3n + 2)= 3m + 3n + 1 + 2= 3m + 3n + 3= 3(m + n + 1)= 3k where k = m + n + 1 and is an integer→ A + B = 3k + 0→ remainder when A + B divided by 3 is 0-------------------------------------------------------------------------From this, you may be able to see that:if A when divided by C has remainder Ra; andif B when divided by C has remainder Rb; then(A + B) divided by C will have remainder equal to the remainder of (Ra + Rb) divided by C
In algebra, when we say "c divided by 22," we are looking at the expression c/22. This expression represents the quotient of c divided by 22. In other words, we are dividing the value of c by 22 to get the result. The result of this division will depend on the specific value of c.
what is 12 decreased by p
(a - t)/(b - t) = c => a - t = c(b - t) = cb - ct = bc - tc => tc - t = bc - a => t(c - 1) = bc - a => t = (bc - a)/(c - 1)
The quotient of c divided by d is called a fraction. In mathematical terms, it is represented as c/d. This fraction represents the result of dividing c by d. The numerator (c) is divided by the denominator (d) to obtain the quotient.
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To divide a number c by a fraction a / b is equal to: c c X b --------- = --------- a a ----- b Therefore, 7 divided by 1 over 8, using above for c = 7, a = 1 and b = 8 is: 7 * 8 ------- = 56 1
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To determine what A, B, and C can be divided by, we need to know the specific values of A, B, and C. Generally, any integer can be divided by 1 and itself, and if they share common factors, they can also be divided by those factors. For example, if A, B, and C are all even numbers, they can be divided by 2. Additionally, if they are all multiples of a certain number, they can be divided by that number as well.
The remainder is 0.If A has a remainder of 1 when divided by 3, then A = 3m + 1 for some integer mIf B has a remainder of 2 when divided by 3, then B = 3n + 1 for some integer n→ A + B = (3m + 1) + (3n + 2)= 3m + 3n + 1 + 2= 3m + 3n + 3= 3(m + n + 1)= 3k where k = m + n + 1 and is an integer→ A + B = 3k + 0→ remainder when A + B divided by 3 is 0-------------------------------------------------------------------------From this, you may be able to see that:if A when divided by C has remainder Ra; andif B when divided by C has remainder Rb; then(A + B) divided by C will have remainder equal to the remainder of (Ra + Rb) divided by C
To find the remainder when (3x^2 - x - 10) is divided by (x - 1), we can use the Remainder Theorem. This states that the remainder of a polynomial (f(x)) divided by (x - c) is (f(c)). Here, (c = 1), so we calculate (f(1) = 3(1)^2 - (1) - 10 = 3 - 1 - 10 = -8). Thus, the remainder is (-8).
∫ (1/x) dx = ln(x) + C C is the constant of integration.
I think I know how to do this but I'm not sure...It's something like:A, B & C are consecutive so:A=A, B=A+/-1, C=A+/-2So:A/(A+/-1)/(A+/-2)=0.3I think it can be worked out from there but I'm not sure how...
2016 divided by c is expressed like this... 2016/c
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1/18x^(5) Then (1/18) X 1/x^(5) = (1/18) x x^(-5) = (1/18) x^(-4) / -4 + C (1/-72) X x^(-4) + C -1/[72x^(4)] + C