Want this question answered?
false!
All positive and negative multiples of 180 degrees. (pi radians)
Nature Of The Zeros Of A Quadratic Function The quantity b2_4ac that appears under the radical sign in the quadratic formula is called the discriminant.It is also named because it discriminates between quadratic functions that have real zeros and those that do not have.Evaluating the discriminant will determine whether the quadratic function has real zeros or not. The zeros of the quadratic function f(x)=ax2+bx+c can be expressed in the form S1= -b+square root of D over 2a and S2= -b-square root of D over 2a, where D=b24ac.... hope it helps... :p sorry for the square root! i know it looks like a table or something...
a sextillion :) i feel clever knowing that
no a plynomial can not have more zeros than the highest (degree) number of the function at leas that is what i was taught. double check the math.
false!
Discuss how you can use the zeros of the numerator and the zeros of the denominator of a rational function to determine whether the graph lies below or above the x-axis in a specified interval?
All positive and negative multiples of 180 degrees. (pi radians)
the zeros of a function is/are the values of the variables in the function that makes/make the function zero. for example: In f(x) = x2 -7x + 10, the zeros of the function are 2 and 5 because these will make the function zero.
The integral zeros of a function are integers for which the value of the function is zero, or where the graph of the function crosses the horizontal axis.
zeros makes a matrix of the specified dimension, filled with zeros.
You cannot. The function f(x) = x2 + 1 has no real zeros. But it does have a minimum.
The zeros of a quadratic function, if they exist, are the values of the variable at which the graph crosses the horizontal axis.
Nature Of The Zeros Of A Quadratic Function The quantity b2_4ac that appears under the radical sign in the quadratic formula is called the discriminant.It is also named because it discriminates between quadratic functions that have real zeros and those that do not have.Evaluating the discriminant will determine whether the quadratic function has real zeros or not. The zeros of the quadratic function f(x)=ax2+bx+c can be expressed in the form S1= -b+square root of D over 2a and S2= -b-square root of D over 2a, where D=b24ac.... hope it helps... :p sorry for the square root! i know it looks like a table or something...
a sextillion :) i feel clever knowing that
The integral zeros of a function are integers for which the value of the function is zero, or where the graph of the function crosses the horizontal axis.
no a plynomial can not have more zeros than the highest (degree) number of the function at leas that is what i was taught. double check the math.