Question

Find the solutions to the given system of equations

x^2+y^2=15 and y= -x - 6

A. No solution
B. (-2,5)
C. (-1,-2) and (5, -5)
D. (-1,2) and (2,-11)

9x^2+3x - 35=y and 3x-1=y

A. (-2,5)
B. (2,7)
C. (2,7) and (-2,-5)
D. (2,-5) and (-2,-5)

Answer 1

your closeest awnsers D

Answer 2

`\bf \begin{cases} x^2+y^2=15\\ y^2=15-x^2\\ y=√(15-x^2)\\ -------\\ y=-x-6 \end{cases}\qquad \qquad √(15-x^2)=-x-6 \\\\\\ \textit{again, squaring both sides}\implies 15-x^2=(-x-6)^2\\\\ -------------------------------\\\\ 15-x^2=x^2+12x+36\implies 0=2x^2+12x+21 \\\\\\ \textit{now, let's check the discriminant of it} \qquad \begin{array}{llccll} 0=&{{ 2}}x^2&{{ +12}}x&{{ +21}}\\ &\uparrow &\uparrow &\uparrow \\ &a&b&c \end{array}`


`\bf discriminant\implies b^2-4ac= \begin{cases} 0&\textit{one solution}\\ positive&\textit{two solutions}\\ negative&\textit{no solution} \end{cases} \\\\\\ 12^2-4(2)(21)\implies 144-168\implies -24`

notice, the discriminant is negative.


on the second system of equations there, check for any typos, there's a solution however, is none of those.