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Hace 3 días · When the polynomial \ (f (x)\) is divided by by \ (x+2\), the remainder is \ (3\), and when \ (f (x)\) is divided by \ (x-1\), the remainder is \ (2\). Find the remainder when \ (f (x)\) is divided by \ ( (x+2) (x-1)\). Let the remainder upon division by \ ( (x+2) (x-1)\) be written in the form \ (ax+b\).
Hace 2 días · The remainder factor theorem is actually two theorems that relate the roots of a polynomial with its linear factors. The theorem is often used to help factorize polynomials without the use of long division.
Hace 4 días · The remainder is what remains after dividing 11 (the dividend) by 4 (the divisor), which in this case is 3. For the same reason a division by zero isn’t possible, it’s not possible to use the modulo operator when the right-side argument is zero.
Hace 5 días · HOW TO FIND REMAINDER 💯💯
Hace 3 días · What is the remainder when \(18!\) is divided by 19? Notation : \(!\) denotes the factorial notation. For example, \(8! = 1\times2\times3\times\cdots\times8 \).
Hace 5 días · Hint: We know the formula ${\text{Dividend = Divisor}} \times {\text{Quotient + Remainder}}$.We can put the values given in first statement in this formula. Then we can write $114 = 19 \times 6$ and $21 = 19 + 2$.When we adjust the equation, we can find the remainder.
Hace 5 días · Remainder is the value of the left over when a number is not exactly divided by the other number. Zero is the remainder when the number is exactly divided by the other number. Also we should know how to find the LCM (Least Common Multiple) of the numbers.
