Ellipses: Example 4

Ellipses

Graph the following equation.

16x² + 25y² + 32x - 150y = 159

Step 1 . Identify the conic section.

This is an ellipse because the x and y terms are both squared,
have different coefficients, and are added.

Step 2 . Write equation in standard form.

(16x²+32x) + (25y²-150y) = 159; Group the x terms, group the y terms

16(x²+2x) + 25(y²-6y) = 159; Factor the leading coefficient from each group

16(x²+2x+1) + 25(y²-6y+9) = 159 + (16?1) + (25?9); Complete the square for x and y

16(x+1)² + 25(y-3)² = 400; Simplify

; Divide each side of the equation by 400 and simplify.

Step 3. Graph the conic.

Identify the center (-1, 3)

Identify the vertices (4, 3), (-6, 3)

Identify the co-vertices (-1, 7), (-1, -1)

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