Which among the following is the correct graphical representation of the quadratic polynomial y=−2x2+2x−0.5?
A
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B
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C
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D
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Solution
The correct option is C Given: y=−2x2+2x−0.5
Since the coefficient of x2 is negative ⇒ The parabola will be downward opening parabola.
On comparing with standard form of quadratic expression y=ax2+bx+c, we get: a=−2,b=2,c=−12
&D=b2−4ac=(2)2−4⋅(−2)⋅(−12)=0
Here, D=0 therefore the given quadratic expression has repeated real root.
Also, we get the roots of the quadratic equation by putting y=0 ⇒y=−2x2+2x−12=0
⇒−2x2+x+x−12=0
⇒−2x(x−12)+(x−12)=0
⇒(x−12)(1−2x)=0
⇒x=12,12
From this we can say that parabola touches x-axis at (12,0).