To solve 4(1 + 3x) = 4 from a graph, find the value of x where:
A) y = 4(1 + 3x) intersects with y = 0.
B) y = 4(1 + 3x) intersects with y = 1.
C) y = 4(1 + 3x) intersects with y = 2.
D) y = 4(1 + 3x) intersects with y = 3.
E) y = 4(1 + 3x) intersects with y = 4.
E) y = 4(1 + 3x) intersects with y = 4.
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Solve.For a hyperbolic mirror the two foci are 44 cm apart. The distance of the vertex from one focus is 6 cm and from the other focus is 38 cm. Position a coordinate system with the origin at the center of the hyperbola and with the foci on the y-axis. Find the equation of the hyperbola.
A. 
- 
= 5
B. 
- 
= 1
C. 
- 
= 5
D. 
- 
= 1
Write a linear inequality that describes the shaded region.y = -2
A. y ? -2 B. x ? -2 C. y ? -2 D. x ? -2
Tell whether the statement is true or false.11 ? {x | x is an even counting number}
A. True B. False
Determine the appropriate rotation formulas to use so that the new equation contains no xy-term.x2 + 4xy + y2 - 8 = 0
A. x = -y' and y = x'
B. x = (x' - y') and y =
(x' + y')
C. x = x' -
y' and y =
x' +
y'
D. x = x' -
y' and y =
x' +
y'