Q1 What is the difference?

The difference between 3x12 and 6x12 is 36.

Q2 Write the polynomial in standard form. Then name the polynomial based on its degrees and number of terms.
4x3+2x2+1-3x

Standard Form:
Name based on degree:
Name based on number of terms:

Standard Form: 4x^3 + 2x^2 - 3x + 1

Name based on degree: This polynomial is a cubic polynomial because the highest degree term is 4x^3.

Name based on number of terms: This polynomial is a quadrinomial because it has four terms.

Q3 Add the following polynomials
(3c2+6c+3)+(4c2-5c+1)

To add the polynomials (3c^2 + 6c + 3) and (4c^2 - 5c + 1), we combine like terms:

(3c^2 + 4c^2) + (6c - 5c) + (3 + 1)
= 7c^2 + 1c + 4

So, the sum of the two polynomials is 7c^2 + c + 4.

Q4 Simplify.
(7x11x)-(2x30)

To simplify (7x^11)-(2x^30), we multiply the coefficients and subtract the exponents of x:

7x^11 - 2x^30

Thus, the simplified form of the expression is 7x^11 - 2x^30.

Q5 Simplify the product using the distributive property
(3x-5)(5x+4)

To simplify the product (3x-5)(5x+4) using the distributive property, we multiply each term in the first polynomial by each term in the second polynomial:

(3x-5)(5x+4)
= 3x(5x) + 3x(4) - 5(5x) - 5(4)
= 15x^2 + 12x - 25x - 20
= 15x^2 - 13x - 20

Thus, the simplified form of the product is 15x^2 - 13x - 20.

Q6 If r=2x+5 Find the value of S, given the equation S=4r2

To find the value of S, given the equation S = 4r^2 and r = 2x + 5, we substitute the value of r into the equation:

S = 4(2x + 5)^2

To simplify, we start by squaring the expression (2x + 5):

S = 4(4x^2 + 20x + 25)

Next, we distribute the 4 to each term inside the parentheses:

S = 16x^2 + 80x + 100

Thus, the value of S, given the equation S = 4r^2 and r = 2x + 5, is 16x^2 + 80x + 100.