To determine the value of $ c $ for the quadratic curve $ y = x^2 + bx + c $ with roots $ x = -2 $ and $ x = 7.5 $, follow these steps:

1. **Use the fact that the roots of the quadratic equation are given:**
The roots of the quadratic equation $ ax^2 + bx + c = 0 $ can be written in factored form as:
$$
(x - \alpha)(x - \beta) = 0
$$
where $ \alpha $ and $ \beta $ are the roots. In this case, $ \alpha = -2 $ and $ \beta = 7.5 $.

2. **Write the quadratic equation in its factored form:**
$$
(x + 2)(x - 7.5) = 0
$$

3. **Expand the factored form to get the standard form of the quadratic equation:**
$$
(x + 2)(x - 7.5) = x^2 - 7.5x + 2x - 15 = x^2 - 5.5x - 15
$$

4. **Compare the expanded form with the given quadratic equation:**
The given quadratic equation is $ y = x^2 + bx + c $. From the expanded form, we have:
$$
x^2 - 5.5x - 15
$$
By comparing coefficients, we see that $ b = -5.5 $ and $ c = -15 $.

Therefore, the value of $ c $ is $ -15 $.

Question

To determine the value of $ c $ for the quadratic curve $ y = x^2 + bx + c $ with roots $ x = -2 $ and $ x = 7.5 $, follow these steps:

1. **Use the fact that the roots of the quadratic equation are given:**
   The roots of the quadratic equation $ ax^2 + bx + c = 0 $ can be written in factored form as:
   $$
   (x - \alpha)(x - \beta) = 0
   $$
   where $ \alpha $ and $ \beta $ are the roots. In this case, $ \alpha = -2 $ and $ \beta = 7.5 $.

2. **Write the quadratic equation in its factored form:**
   $$
   (x + 2)(x - 7.5) = 0
   $$

3. **Expand the factored form to get the standard form of the quadratic equation:**
   $$
   (x + 2)(x - 7.5) = x^2 - 7.5x + 2x - 15 = x^2 - 5.5x - 15
   $$

4. **Compare the expanded form with the given quadratic equation:**
   The given quadratic equation is $ y = x^2 + bx + c $. From the expanded form, we have:
   $$
   x^2 - 5.5x - 15
   $$
   By comparing coefficients, we see that $ b = -5.5 $ and $ c = -15 $.

Therefore, the value of $ c $ is $ -15 $.

Knowee AI · Accepted Answer

To determine the value of $ c $ for the quadratic curve $ y = x^2 + bx + c $ with roots $ x = -2 $ and $ x = 7.5 $, follow these steps:

1. **Use the fact that the roots of the quadratic equation are given:**
   The roots of the quadratic equation $ ax^2 + bx + c = 0 $ can be written in factored form as:
   $$
   (x - \alpha)(x - \beta) = 0
   $$
   where $ \alpha $ and $ \beta $ are the roots. In this case, $ \alpha = -2 $ and $ \beta = 7.5 $.

2. **Write the quadratic equation in its factored form:**
   $$
   (x + 2)(x - 7.5) = 0
   $$

3. **Expand the factored form to get the standard form of the quadratic equation:**
   $$
   (x + 2)(x - 7.5) = x^2 - 7.5x + 2x - 15 = x^2 - 5.5x - 15
   $$

4. **Compare the expanded form with the given quadratic equation:**
   The given quadratic equation is $ y = x^2 + bx + c $. From the expanded form, we have:
   $$
   x^2 - 5.5x - 15
   $$
   By comparing coefficients, we see that $ b = -5.5 $ and $ c = -15 $.

Therefore, the value of $ c $ is $ -15 $.

A quadratic curve y=x^2+bx+c has roots x= -2 and x=7.5. Determine the value of c.

Question

A quadratic curve $y = x^2 + bx + c$ has roots $x = -2$ and $x = 7.5$ . Determine the value of $c$ .

Solution

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