Question

Write the equation of a parabola, in standard form, that goes through these points: (0, 3) (1, 4) (-1, -6)

Answer 1

`f(x)=ax^2+bx+c\\\\(0;\ 3)\to x=0;\ y=3\to f(0)=3\\therefore\\3=a\cdot0^2+b\cdot0+c\\\boxed{c=3}\\\\(1;\ 4)\to x=1;\ y=4\to f(1)=4\\therefore\\4=1^2\cdot a+1\cdot b+3\\4=a+b+3\ \ \ |subtract\ 3\ from\ both\ sides\\(1)\boxed{a+b=1}\\\\(-1;-6)\to x=-1;\ y=-6\to f(-1)=-6\\therefore\\-6=(-1)^2a+(-1)b+3\\-6=a-b+3\ \ \ \ |subtract\ 3\ from\ both\ sides\\(2)\boxed{a-b=-9}`

We have (1) & (2):


`\underline{+\left\{\begin{array}{ccc}a+b=1\\a-b=-9\end{array}\right}\ \ \ \ |add\ both\ sides\\.\ \ \ \ \ \ 2a=-8\ \ \ \ |divide\ both\ sides\ by\ 2\\.\ \ \ \ \ \ \ \boxed{a=-4}\\\\subtitute\ the\ value\ of\`