Question

When the quadratic equation 5x^2=2(2x+3) is expressed in the standard form, the constant term obtained is

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Answer 1

Answer:

Step-by-step explanation:

A quadratic equation in a variable x is an equation which is of the form ax² +bx+ C = 0 where constants a, b and c are all real numbers and a 0.

Here, we are provided with a quadratic equation and we are supposed to determine the constant term.

Let's first simplify the given quadratic equation.

5x² = 2(2x + 3)

5.x² = 4x + 6

5x² - 4x = 6

5x²

4x

6=0

Now, Comparing the given equation with the standard form of quadratic equation, we get:

a = 5, b = -4, c = -6

Here the constant term is c it means the value of constant term is -6.

Therefore, the constant term is -6.

Answer 2

Answer:

Constant term = - 6

Step-by-step explanation:

We simplify the quadratic equation as below

${5x}^{2} = 2(2x + 3) \\ => {5x}^{2} = 4x + 6 \\ = {5x}^{2} - 4x - 6 = 0$

Comparing with the general quadratic equation ax² + bx + c = 0 we get

a = 5 , b = - 4 , c = - 6

Hence the constant term = c = - 6

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