Precal chapter 6 vocab
The third angle is found by subtracting the measure of the given angle and the angle found in the second step from ___
180°
True or false? Given two nonzero vectors v and w, v can be decomposed into two vectors, one parallel to w and the other orthogonal to w
True. It is always possible to decompose vector v into two vectors, because v1, the vector parallel to w, and v2, the vector orthogonal to w, can be found by decomposing the vector v
v=ai+bj, the horizontal component of v is __. The vertical component of v is __. The magnitude of v is given by ||v||= _________
a, b, √a²+b²
If A, B, and C are the measures of the angles of a triangle, and a, b, and c are the lengths of the sides opposite these angles, then the Law of Sines states that
a/sinA=b/sinB=c/sinC
The value √a²+b² is the ________ _____ of the complex number a+bi
absolute value
v=||v|| ____i+||v|| ____j
cosθ, sinθ
To test whether the graph of a polar equation may be symmetric with respect to the line θ=π/2 (y-axis), replace ____ with ____
(r,θ), (-r,-θ)
(r,θ)=(__, θ+π)
-r
To test if a polar equation may be symmetric with respect to the polar axis, replace θ by
-θ
The quotient of two complex numbers in polar form is found by _________ their moduli and __________ their arguments.
dividing, subtracting
If v=a1 i+ b1 j and w=a2 i+ b2 j are vectors, the product v*w, called the ____ ________, is defined as v*w=_________
dot product, a1*a2+ b1*b2
In the polar form of a complex number, r(cosθ+ i sinθ), r is called the ________ and θ is called the _______
modulus, argument
he product of two complex numbers in polar form is found by _______ their moduli and ________ their arguments.
multiplying, adding
The equation r=4 sinθ can be converted to a rectangular equation by _________ both sides by __ and then replacing r² with ______ and r sinθ with __
multiplying, r, x²+y², y
To solve an oblique triangle given three sides (SSS), the first step is to find the angle opposite the longest side using the Law of ______. Then we find either of the two remaining acute angles using the Law of______.
Cosines, sines
True or false: A triangle in which two sides and an angle opposite one of them are given (SSA) always results in at least one triangle.
False because an oblique triangle in which two sides and an angle are given results in an ambiguous case. The result may be one triangle, two triangles, or no triangle at all.
True or false? The definition of work indicates that work is a vector
False. The work W done by F in moving an object from A to B is defined W=F*AB. Since the result of the dot product is a scalar, work is a scalar.
The coordinate (5,135°) lies in quadrant
II
The coordinate (-7, -π/4) lies in quadrant
II
The coordinate (-8, π/4) lies in quadrant
III
The coordinate (-7, 135°) lies in quadrant
IV
The coordinate (3, -π/4) lies in quadrant
IV
The coordinate (4,5π/3) lies in quadrant
IV
Then we use the Law of ______ to find the angle opposite the shorter of the two given sides. This angle is always ______
Sines, acute
True or false? The graph of a polar equation may have symmetry even if it fails a test for that particular symmetry.
True
If A, B, and C are the measures of the angles of any triangle and if a, b, and c are the lengths of the sides opposite the corresponding angles, then which of the following is a form of the Law of Cosines?
b²= a²+c²-2ac cosB
In polar coordinates, the graphs of r=a cosθ and r=a sinθ are
circles
Every nonzero complex number has exactly __ distinct nth root(s).
n
A triangle that does not contain a right angle is called a/an ______ triangle. Solving such a triangle means finding the lengths of its _____ and the measurements of its ______
oblique, sides, angles
If v*w=0, then the two vectors v and w are _________
orthogonal
The foundation of the polar coordinate system consists of a point, called the_____, and a ray extending out from it, called the ________ _____
pole, polar axis
The origin in rectangular coordinates coincides with the _____ in polar coordinates; the positive x-axis in rectangular coordinates coincides with the _______ _____
pole, polar axis
(r,θ)=(__, θ+2π)
r
The equation x+y=7 can be converted to a polar equation by replacing x with______ and replacing y with ______
r cosθ, r sinθ
To test whether the graph of a polar equation may be symmetric with respect to the pole(origin), replace ___ with ___
r, -r
r1(cosθ1+i sinθ1) /r2(cosθ2+i sinθ2)= _____[cos(_____)+i sin(_____)]
r1/r2, θ1-θ2, θ1-θ2
r1(cosθ1+i sinθ1) *r2(cosθ2+i sinθ2)= _____[cos(_____)+i sin(_____)]
r1r2, θ1+θ2, θ1+θ2
In the complex plane, the horizontal axis is referred to as the _____ axis and the vertical axis is called the _______ axis
real, imaginary
If F1 and F2 are two forces simultaneously acting on an object, the vector sum F1+F2 is called the ________ force
resultant
DeMoivre's Theorem states that [r(cosθ+i sinθ)]n= __[cos___+i sin___]
rn, (nθ), (nθ)
A quantity that has magnitude but no direction is called a/an _______
scalar
To solve an oblique triangle given two sides and an included angle (SAS), the first step is to find the missing_____ using the Law of _____
side, Cosines
We can always use the Law of Sines to find missing parts of triangles in which one _____ and two ______ are known
side, angles
The equation r=3 can be converted to a rectangular equation by_______ both sides and then replacing r² with _______
squaring, x²+y²
The equation θ=5π/4 can be converted to a rectangular equation by taking the ________ of both sides and then replacing tanθ with ____
tangent, y/x
The vectors i and j both have magnitudes of 1 and are called _____ vectors. The direction of vector i is along the positive __-axis. The direction of vector j is along the positive __-axis
unit, x, y
For any nonzero vector v, the unit vector that has the same direction as v is ______. To find this vector, divide v by its __________
v/||v||, magnitude
A ______ is a quantity that has both magnitude and direction
vector
If v and w are two nonzero vectors and θ is the smallest non negative angle between them, then v*w=_________
||v|| ||w|| cosθ
One method for graphing a polar equation is the point-plotting method. Substitute convenient values of __ into the equation and then determine the values for __
θ, r
Heron's formula for the area of a triangle with sides a, b, and c is Area= _________ where s=
√(s(s-a)(s-b)(s-c) , 1/2(a+b+c)
To convert a complex number from rectangular form, z=a+bi, to polar form, z= r(cosθ+i sinθ), we use the relationships r=______ and tanθ=___ noting the quadrant in which the graph of z lies
√a²+b², b/a
