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 ≤
Theof acan be found by addingpto thekif theopens up or down. (h,k+p) Substitute the known values ofh,p, andkinto theand simplify. (2,174) (2,174)(2,174) Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. ...
Substitute the known values ofh,p, andkinto theand simplify. (1,294) (1,294)(1,294) Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=1x=1 y−7=(x−1)2y-7=(x-1)2 ( ) | [ ]
Find the Axis of Symmetry y=-2(x+3)^2+8y=−2(x+3)2+8y=-2(x+3)2+8 Use the vertex form, y=a(x−h)2+ky=a(x-h)2+k, to determine the values of aa, hh, and kk. a=−2a=-2 h=−3h=-3 k=8k=8Since the value of aa is negative, the parabola opens down. ...
Theof acan be found by addingpto thekif theopens up or down. (h,k+p) Substitute the known values ofh,p, andkinto theand simplify. (-3,398) (−3,398)(-3,398) Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. ...
Theof acan be found by addingpto thekif theopens up or down. (h,k+p) Substitute the known values ofh,p, andkinto theand simplify. (-5,-116) (−5,−116)(-5,-116) Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. ...
Theof acan be found by addingpto thekif theopens up or down. (h,k+p) Substitute the known values ofh,p, andkinto theand simplify. (-4,478) (−4,478)(-4,478) Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. ...
Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=2x=2 y=2(x−2)2−4y=2(x-2)2-4 ( ) | [ ] √ ≥ 7 8 9 ≤ ...
Find theaxis of symmetryby finding thelinethat passes through thevertexand thefocus. x=−2x=-2 y=−3(x+2)2+12y=-3(x+2)2+12 ( ) | [ ] √ ≥ 7 8 9 ≤
Find the Axis of Symmetry y=2(x-4)^2-3y=2(x−4)2−3y=2(x-4)2-3 Use the vertex form, y=a(x−h)2+ky=a(x-h)2+k, to determine the values of aa, hh, and kk. a=2a=2 h=4h=4 k=−3k=-3Since the value of aa is positive, the parabola opens up. Opens Up...