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प्रश्न
Write the index form of the polynomial using variable x from its coefficient form.
(6, 1, 0, 7)
उत्तर
The coefficient form of the polynomial is (6, 1, 0, 7).
Therefore, the index form the polynomial is 6x3 + x2 + 0x + 7
i.e. 6x3 + x2 + 7
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संबंधित प्रश्न
Write the coefficient of m3 in the given polynomial.
`m^3`
Write the coefficient of m3 in the given polynomial.
`(-3)/2+m - sqrt 3 m^3`
Write the coefficient of m3 in the given polynomial.
`-2/3 m^3 - 5 m^2 + 7m -1`
Write the following polynomial in standard form.
m3 + 3 + 5m
Write the following polynomial in coefficient form.
`x^3 - 2`
Write the following polynomial in coefficient form.
2m4 - 3m2 + 7
Write the following polynomial in standard form.
4x2 + 7x4 - x3 - x + 9
Write the following polynomial in standard form.
p + 2p3 + 10p2 + 5p4 - 8
Write the following polynomial in coefficient form.
x4 + 16
Write the index form of the polynomial using variable x from its coefficient form.
(3, -2, 0, 7, 18)
