In a quadratic equation of the form ax^2 + bx + c = 0, if a is not equal to zero, then the zeros of the equation can be found using the formula x = (-b ± √(b^2 - 4ac)) / 2a. In this case, the zero is given as 2. Therefore, we can substitute x = 2 into the equation to get 2(2)^2 + p(2) + 14 = 0. Solving this equation will give us the value of p.
to find the domain first check all the possibilities of the denominator attaining a value of zero then if the function has any thing inside a square root, the expression inside the root must be always greater than or equal to zero.If the square root is in the denominator then the expression inside must be just greater than zero but not equal to zero.
Complete the square, then find the value of x that would make the bracket zero ax^2 + bx + c = 0 line of symmetry is x = (-b/2a)
The square root of zero is zero.
Eighty,zero zero zero,zero zero zero ,+five,zero zero zero,zero zero zero,+three, thousand+five
two. 5+-3 you find the difference in the absolute value (the distance from zero), and whichever is the biggest (positive or negative), goes into that form of integer. other tip: -number + -number= a negative
Zero.
zero
|-52.5|+61.2 remember absolute value is the distance on the number line away from zero 52.5+61.2= 113.7
It has to be between zero and 2, but the exact value depends on the value of Θ .
-5 is the zero of x+5
20
That doesn't factor neatly. Applying the quadratic equation, we find two imaginary solutions: Zero plus or minus i times the square root of 3.x = 1.7320508075688772ix = -1.7320508075688772iwhere i is the square root of negative one.
to find the domain first check all the possibilities of the denominator attaining a value of zero then if the function has any thing inside a square root, the expression inside the root must be always greater than or equal to zero.If the square root is in the denominator then the expression inside must be just greater than zero but not equal to zero.
The discriminant is -167.
Yes because its discriminant is equal to zero
you have to find out how far the number is from zero
It has no solutions because the discriminant is less than zero.