Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=−5x=-5 y=−4(x+5)2y=-4(x+5)2 ( ) | [ ] √ ≥ 7 8 9 ≤ ...
Step 6.1 The focus of a parabola can be found by adding to the y-coordinate if the parabola opens up or down. Step 6.2 Substitute the known values of , , and into the formula and simplify.Step 7 Find the axis of symmetry by finding the line that passes through the vertex and the fo...
This is the form of anellipse. Use this form to determine the values used to find the center along with the major andminoraxisof theellipse. (x−h)2b2+(y−k)2a2=1(x-h)2b2+(y-k)2a2=1 Match the values in thisellipseto those of the standard form. Thevariableaarepresents theradiu...
Step 6.1 The focus of a parabola can be found by adding to the y-coordinate if the parabola opens up or down. Step 6.2 Substitute the known values of , , and into the formula and simplify.Step 7 Find the axis of symmetry by finding the line that passes through the vertex and the fo...
Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=−1x=-1 y−5=(x+1)2y-5=(x+1)2 ( ) | [ ] √ ≥ 7 8 9 ≤
Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=−4x=-4 y=−2(x+4)2+6y=-2(x+4)2+6 ( ) | [ ] √ ≥ 7 8 9 ≤
Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=−1x=-1 y−4=(x+1)2y-4=(x+1)2 ( ) | [ ] √ ≥ 7 8 9 ≤
Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=2x=2 y−7=(x−2)2y-7=(x-2)2 ( ) | [ ] √ ≥ 7 8 9 ≤
Substitute the known values ofh,p, andkinto theand simplify. (1,254) (1,254)(1,254) Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=1x=1 y−6=(x−1)2y-6=(x-1)2 ( ) | [ ]
Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=34x=34 y=2x2−3x+4y=2x2-3x+4 ( ) | [ ] √ ≥ 7 8 9 ≤ 4