Question

if an equation has a degree of 2 then the equation is quadratic identify the hypothesis of the statement

Answer 1

"an equation has a degree of 2"

Explanation:

Given:

• If an equation has a degree of 2, then the equation is quadratic.

In this sentence, the hypothesis is the supposition which is after the word "if". Therefore, the hypothesis is "an equation has a degree of 2".

In addition, the conclusion is after the word "then". Therefore, the conclusion is "the equation is quadratic"

Answer 2

An equation has a degree of 2 then the equation is quadratic.

SOLUTION:

Given, an equation has a degree of 2.

We have to find whether an equation which has degree 2 becomes quadratic equation or not.

When we see in detail about quadratic, it is a Latin originated word, describes something pertaining to squares.

We know that, general form a quadratic equation is
`a x^(2)+b x+c=0`

Where a, b, c are constant coefficients of
`x^(2), x` and constant respectively.

And, a ≠ 0 is an must to satisfy condition because when a = 0, the term
`x^(2)` becomes zero.

Which means quadratic equation is any equation having degree 2.

Hence, an equation has a degree of 2 then the equation is quadratic equation.