Advertisements
Advertisements
प्रश्न
Simplify `(14"p"^5"q"^3)/(2"p"^2"q") - (12"p"^3"q"^4)/(3"q"^2)`
Advertisements
उत्तर
`(14"p"^5"q"^3)/(2"p"^2"q") - (12"p"^3"q"^4)/(3"q"^2) = 14/2 "p"^(5-2)"q"^(3-1) - 12/3 "p"^3"q"^(4-3)`
= 7p3q2 – 4p3q
APPEARS IN
संबंधित प्रश्न
Write each of the following polynomials in the standard form. Also, write their degree.
Divide\[\sqrt{3} a^4 + 2\sqrt{3} a^3 + 3 a^2 - 6a\ \text{by}\ 3a\]
Divide 14x2 − 53x + 45 by 7x − 9.
Divide 3y4 − 3y3 − 4y2 − 4y by y2 − 2y.
Divide x4 + x2 + 1 by x2 + x + 1.
Verify the division algorithm i.e. Dividend = Divisor × Quotient + Remainder, in each of the following. Also, write the quotient and remainder.
| Dividend | Divisor |
| 14x2 + 13x − 15 | 7x − 4 |
Verify the division algorithm i.e. Dividend = Divisor × Quotient + Remainder, in each of the following. Also, write the quotient and remainder.
| Dividend | Divisor |
| 4y3 + 8y + 8y2 + 7 | 2y2 − y + 1 |
Using division of polynomials, state whether
4x − 1 is a factor of 4x2 − 13x − 12
Find whether the first polynomial is a factor of the second.
y − 2, 3y3 + 5y2 + 5y + 2
Find whether the first polynomial is a factor of the second.
4y + 1, 8y2 − 2y + 1
