Across
- 4. Functions whose graphs are symmetric with respect to the origin. f(x) = x^5 is an odd function.
- 6. When applying point symmetry to a set of points, each point P in the set must have an _____ _____ P which is also in the set. When the definition of point symmetry is extended.
- 12. y varies directly as x^n. There is some non-zero constant K such that y=kx^n.
- 13. the set of all consecutive integers between -2 and 2. The set of abscissas.
- 14. another type of symmetry. Two distinct points P and P^1 are symmetric with respect to a line L if and only if l is the perpendicular bisector of PP.
- 15. the set of ordinates. The difference of the greatest and least values in a set of data.
Down
- 1. an expression of the form aoxn = a1xn-1 + an-2x2+an-1x+an. The coefficients represent complex numbers.
- 2. the imaginary numbers combined with the real numbers compose the set of __________. Any number of the form a+bi where a and b are real numbers.
- 3. a basic graph that is transformed to create other members in a family of graphs. The coefficient of x in each equation is 1.
- 5. the composition of a function and itself. The outputs are called iterates.
- 7. the second element of an ordered pair. The value of a coordinate on the vertical axis.
- 8. Every polynomial equation with degree greater than zero has at least one root in the set of complex numbers. The degree of a polynomial indicates the number of possible roots of a polynomial equation.
- 9. the first element of an ordered pair. It has to do with Relations and Functions.
- 10. Two distinct points P and P^1 are symmetric with respect to point M if and only if M is the midpoint of PP. Point M is symmetric with respect to itself.
- 11. a pairing of one set of elements to a second set. They can be expressed as a/an.