se Home Use the derivative to find the vertex of the parabola. y=2x2 + 4x +...
(1 point) Use the derivative to find the vertex of the parabola y = -3x2 + 12x - 9. Answer: the vertex has coordinates x = and y =
5 4 3 + - + 6x - 4x + 8)e to Find the derivative of the function. y= (2x3 – 2x2 + 8x - 6)e ** O B. (6x5 - 6x4 + 24x3 – 12x2 - 4x + 8)e O C. (6x5 - 6x4 + 24x3 – 1872)e ** OD. (6x2 - 4x+8)e ** to
Find the standard form of the equation of the parabola with vertex at the origin and 3 focus at (0, -3). O A y = –6x² OB) y = 1x2 OC) y = 6x2 OD)x= -6y? DE) y = - 1/2 x ² OF) x = - 1 34² G) x = 1/3 4² O H) x = 6y²
Use the graph of the parabola to fill in the table. (a) Does the parabola open upward or downward? 61 41 u O upward downward (b) Find the coordinates of the vertex. 2+ -10 - 10 vertex: OD -4 -6 -10 (c) Find the intercept(s). For both the x- and y-intercept(s), make sure to do the following. • If there is more than one, separate them with commas. • If there are none, select "None". x-intercept(s): 0 y-intercept(s): 0 (d)...
Find the partial derivative. Find fx (-2,3) when f(x,y) = 2x2 – 3xy - y. O A. - 10 B. 15 C. -9 OD. 14
Use the graph of the parabola to fill in the table. 101 (a) Does the parabola open upward or downward? O upward downward (b) Find the equation of the axis of symmetry. -10 -8 -6 10 4 equation of axis of symmetry: 1 -X (c) Find the intercept(s). For both the x- and y-intercept(s), make sure to do the following. • If there is more than one, separate them with commas. • If there are none, select "None". x-intercept(s): 1...
with procedure please 4x2 + 18x - 13. 7) Use the second derivative test to find x - coordinate of the vertex of the parabola y = a) 9 4 b) O 13 4 c) O 13 4 d) O 9 4
Use the graph of the parabola to fill in the table. 100 (a) Does the parabola open upward or downward? upward downward -10 10 (b) Find the intercept(s). For both the x- and y-intercept(s), make sure to do the following. • If there is more than one, separate them with commas. • If there are none, select "None". - 3 10- x-intercept(s): 1 y-intercept(s): 1 (c) Find the equation of the axis of symmetry. equation of axis of symmetry: 1...
Use the graph of the parabola to fill in the table. (a) Does the parabola open upward or downward? • upward downward (b) Find the coordinates of the vertex. vertex: (0 (C) Find the intercept(s). For both the x- and y-intercept(s), make sure to do the following. • If there is more than one, separate them with Commas. • If there are none, select "None". x-intercept(s): 1 y-intercept(s);
Use the graph of the parabola to fill in the table. 10+ (a) Does the parabola open upward or downward? upward downward (b) Find the equation of the axis of symmetry. k -10 8 10 equation of axis of symmetry: I (c) Find the coordinates of the vertex. vertex: (D (d) Find the intercept(s). For both the x- and y-intercept(s), make sure to do the following. • If there is more than one, separate them with commas. • If there...