Given points(-1,1),  and (-11,-9)  form the vertices of the base of a triangle, find a third point so that the three points form the vertices of an isosceles triangle.
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Graph the function, showing all asymptotes (those that do not correspond to an axis) as dashed lines. List the x- and y-intercepts.f(x) = 

A. x-intercepts: (1, 0) and (-4, 0) , 
y-intercept:  ;

B. No x-intercepts, y-intercept: (0, -4) ;

C. x-intercepts: (-1, 0) and (4, 0) , 
y-intercept:  ;

D. No x-intercepts, y-intercept: (0, -4) ;

Use the given conditions to find an equation in slope-intercept form of each of the nonvertical lines. Write vertical lines in the form x = h.Parallel to x = -6; passing through (9, 5)

A. y = 5 B. x = 9 C. x = 5 D. y = -6

Find the standard form of the equation of the hyperbola.

A.  -  = 1
B.  -  = 1
C.  -  = 1
D.  -  = 1

Graph the function using its vertex, axis of symmetry, and intercepts.f(x) = x2 + 8x + 16 

A. vertex (4, 0)
intercepts (0, 16), (4, 0)
 
B. vertex (-4, 16)
intercept (0, 32)

C. vertex (4, 16)
intercept (0, 32)
 
D. vertex (-4, 0)
intercepts (0, 16), (-4, 0)