(i) 2 + x^2 + x   

(ii) 2 - x^2 + x^3 

(iii)  pi/2x^2 + x

(iv) √(2)x - 1

Solution:

Explanation:

A coefficient is a number or quantity that is associated with a variable. It's commonly an integer multiplied by the variable immediately adjacent to it.

(i) 2+x²+x 

The x² coefficient is 1.

(ii) 2-x²+x³

The x² coefficient is -1.

(iii) (π/2)x²+x

The x² coefficient is π /2.

(iv)√2x-1

In the provided formulation, there is no x2 term. It can be rewritten as 0x² +√ 2x - 1

The coefficient of x² equals 0 because x² does not exist.

Final Answer:

(i) 2+x²+x , the coefficient of  x² is 1.

(ii) 2-x²+x³, the coefficient of   x²  is -1.

(iii) (π/2)x²+x, here the coefficient of   x²  is  π/2.

(iv) √2x-1, the coefficient of   x²  is  0.

A:6 ÷ 3 =2

B:3 ÷ 6 =1/2 

C:6 ÷ 3 ≠ 3 ÷ 6 

D: None of the above

Solution:

Explanation 

Solution:

Explanation:

• The triangular prism's sides and bases are either congruent or oblique. 
• The prism's edges connect to the appropriate sides. 
• The two bases of this prism are equilateral triangles, and their edges are parallel to one another. 
• To grasp the structure, look at the diagram below.

• It contains 9 edges, 5 faces, and 6 vertices in total (which are joined by the rectangular faces).
• It features three rectangular sides and two triangular bases.
• The triangular prism is considered to be semiregular if the triangular bases are equilateral and the other faces are squares rather than rectangles.

Final Answer:

5 faces and 9 edges.

Solution:

Explanation:

• A number's cube root is a number that, when multiplied three times, returns the original number 125. 
• The cube root of 125 is represented as ∛125 using the 3rd root sign.
• Let P be an integer such that its cube is 125, P³ = 125 or .
• Assume that P = 1,2,3... and that its cube equals 125.

            1 x 1 x 1 = 1

            2 x 2 x 2 = 8

            3 x 3 x 3 = 27

            4 x 4 x 4 = 64

            5 x 5 x 5 = 125

• As a result, ∛125 = ∛5x5x5=5 .

Final Answer:

Hence, the cube root of 125 is 5 .

Solution:

From the question, we have to find the square of .

So,

Final Answer:

Square root is .