Write the Standard Form of a Linear Polynomial with Real Coefficients. - Mathematics

Write the standard form of a linear polynomial with real coefficients.

Short Note

Any linear polynomial in variable x with real coefficients is of the form `f(x)=ax+b`, where a, b are real numbers and `a ≠ 0`

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Chapter 2: Polynomials - Exercise 2.4 [Page 58]

Chapter 2 Polynomials
Exercise 2.4 | Q 3 | Page 58

Classify the following polynomials as polynomials in one-variable, two variables etc:

`xy+yx+zx`

Write a quadratic polynomial, sum of whose zeros is \[2\sqrt{3}\] and their product is 2.

If (x + a) is a factor of 2x² + 2ax + 5x + 10, find a.

If graph of quadratic polynomial ax² + bx + c cuts positive direction of y-axis, then what is the sign of c?

If α and β are the zeros of the polynomial f(x) = x² + px + q, then a polynomial having \[\frac{1}{\alpha} \text{and}\frac{1}{\beta}\] is its zero is

If the product of zeros of the polynomial f(x) ax³ − 6x² + 11x − 6 is 4, then a =

Which of the following is a polynomial?

Divide. Write the quotient and the remainder.

(21x⁴ − 14x² + 7x) ÷ 7x³

`sqrt(2)` is a polynomial of degree ______.

Determine the degree of the following polynomial:

–10