How do you write a polynomial in standard form, then classify it by degree and number of terms $4 g - g^{3} + 3 g^{2} - 2$ $4g-g^3 +3g^2 -2$ ?

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Answer 1 · 2018-06-15T09:14:29

$Standard form of equation - g^{3} + 3 g^{2} + 4 g - 2$ $"Standard form of equation " color(green)(-g^3 + 3g^2 + 4g - 2$

$Degree of polynomial = 3$ $color(brown)("Degree of polynomial " = 3$

$No. of terms = 4$ $color(brown)("No. of terms " = 4$

$4 g - g^{3} + 3 g^{2} - 2$ $4g - g^3 + 3g^2 -2$

$Standard form of equation - g^{3} + 3 g^{2} + 4 g - 2$ $"Standard form of equation " color(green)(-g^3 + 3g^2 + 4g - 2$

$Degree of polynomial = 3$ $color(brown)("Degree of polynomial " = 3$

$No. of terms = 4$ $color(brown)("No. of terms " = 4$

How do you write a polynomial in standard form, then classify it by degree and number of terms 4g−g3+3g2−24g-g^3 +3g^2 -2?