if the graph of a polynomial intersects the xaxis at only one point, it cannot be a quadratic polynomial (ans only in true or false)
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if the graph of a polynomial intersects the xaxis at only one point, it cannot be a quadratic polynomial (ans only in true or false)
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Answer:
Yes, it can be a quadratic polynomial.
Answer:
the statement is false
Step-by-step explanation:
because the polynomials of form ( x+ a) ^2 and ( x - a)^2 has has only equal roots and graph of these polynomials cut the X - axis is at any one
point.
these polynomials are quadratic polynomials for example
x^2 + 2x +1 = 0 X - axis cut the axis at only one point. i.e. x= -1
thus the statement is false