QuestionThe equation has two real and distinct roots. Determine the range of values for .
Studdy Solution
STEP 1
1. The quadratic equation has real and distinct roots if its discriminant is positive.
2. The discriminant of a quadratic equation is given by .
3. For the roots to be real and distinct, .
STEP 2
1. Identify the coefficients of the quadratic equation.
2. Write the expression for the discriminant.
3. Set up the inequality for the discriminant to be greater than zero.
4. Solve the inequality to find the range of values for .
STEP 3
Identify the coefficients of the quadratic equation :
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STEP 4
Write the expression for the discriminant :
STEP 5
Set up the inequality for the discriminant to be greater than zero:
STEP 6
Expand and simplify the inequality:
STEP 7
Solve the quadratic inequality .
First, find the roots of the equation using the quadratic formula:
where , , and .
The roots are:
STEP 8
Determine the intervals where the inequality holds.
The roots divide the number line into intervals: , , and .
Test each interval to determine where the inequality holds:
- For , choose :
- For , choose :
- For , choose :
The inequality holds for .
The range of values for is .
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