Find the equation represented by the graph shown below.
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Rewrite the eqn. to the standard form
Solve for x to find the eqns of the right and left sides
of the ellipse.
This is the graph of the right half of a standard ellipse.
Solve for
We can only solve for either
or
in terms of the other.
Compute the dot product and set it to zero.
Find a nonzero vector that is perpendicular ot the vector
u = < -2, 7>
Find the vertex, focus and the directrix of the parabola
.
For the vectors u, v and w shown in the figure, which
one of the following relations is TRUE?
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You may choose any real number for
To find the point of intersection:
Therefore, the intersection will be in the Quadrant
I only.
The fact that y is under the square root ==> that
y must be positive.
The fact that x is equal to the squre root of something
==> x must be positive.
Therefore, the equation of the ellipse is:
Substitute
in the second equation
Form of the ellipse read from the given foci
Which one of the following is FALSE?
Find the number of solutions of the equation
over the interval [0, 3
p
/2)
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The zeros of f(x) are obtained by setting f(x) = 0 and
solving for x.
Find the zeros of the function
in the interval [0, 2
p)
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Find the set of solutions of the equation sin3x = 1.
Find all the solutions of the equation
,
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Expand the cosine of the difference
Apply cosine to both sides.
Solve the equation
for x.
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The number of solutions is 4.
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Note:
is not a solution since
is not defined.
Divide by sin(x) and consider that sin(x) =0 may include
solutions.
