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Quadratic Concepts
26
Domain : The set of all values for which the independent variable is defined (x-value)
Range : The set of all values of the dependent variable. All values are determined by the values in the domain.
Relation : Relationship between two variables
Function : A relation in which there is only one value of the dependent variable for each value of the independent variable
Function Notation : What is f(x) called
a value : Represents whether the parabola is stretched or compressed and the direction of opening
h value : Horizontal translation
k value : Vertical translation
FOIL : Used to multiply two binomials
GCF : Before factoring you must find the ___
Vertex : Maximum/minimum point of the parabola
Parabola : The graph that resembles the letter āUā
AOS : Short for axis of symmetry
x intercept : The value of which a graph meets the x-axis
y intercept : The value of the dependent variable when the independent variable is zero
Discriminant : The expression of b2-4ac in the quadratic formula
Zeros : The values of x for which a relation has the value of zero
Variable : Letter or symbol that represents a number
Minimum value : Least value taken by the dependent variable in a relation or function
Maximum value : Greatest value taken by the dependent variables in a relation or function
Expand : Write an expression in extended but equivalent form
Degree : The ______ of a polynomial with a single variable is the value of the highest exponent of the variable
Factored form : A quadratic function in the form of f(x)=a(x-r)(x-s) is _____________
Standard form : A quadratic function in the form of f(x)=ax2+bx+c is _____________
Vertex form : A quadratic function in the form of f(x)=a(x-h)+k is _____________
Trinomial : An algebraic expression with three terms
VLT : Stands for Vertical Line Test; determines whether the graph is a function or not
Factor : to express a number as a product of 2 or more numbers, or an algebraic expression as product of two or more other algebraic equations
Quadratic Concepts
Across:2. | Greatest value taken by the dependent variables in a relation or function | 6. | A relation in which there is only one value of the dependent variable for each value of the independent variable | 7. | A quadratic function in the form of f(x)=a(x-h)+k is _____________ | 9. | Represents whether the parabola is stretched or compressed and the direction of opening | 11. | Used to multiply two binomials | 12. | Short for axis of symmetry | 15. | Horizontal translation | 17. | The values of x for which a relation has the value of zero | 18. | Relationship between two variables | 19. | The value of the dependent variable when the independent variable is zero | 21. | Vertical translation | 22. | The ______ of a polynomial with a single variable is the value of the highest exponent of the variable | 24. | The set of all values for which the independent variable is defined (x-value) | 25. | A quadratic function in the form of f(x)=a(x-r)(x-s) is _____________ |
| | Down:1. | Maximum/minimum point of the parabola | 3. | Least value taken by the dependent variable in a relation or function | 4. | Before factoring you must find the ___ | 5. | An algebraic expression with three terms | 6. | What is f(x) called | 8. | Write an expression in extended but equivalent form | 10. | Stands for Vertical Line Test; determines whether the graph is a function or not | 13. | The value of which a graph meets the x-axis | 14. | The set of all values of the dependent variable. All values are determined by the values in the domain. | 16. | A quadratic function in the form of f(x)=ax2+bx+c is _____________ | 20. | Letter or symbol that represents a number | 23. | to express a number as a product of 2 or more numbers, or an algebraic expression as product of two or more other algebraic equations |
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© 2015
PuzzleFast.com, Noncommercial Use Only
Quadratic Concepts
Across:2. | Greatest value taken by the dependent variables in a relation or function | 6. | A relation in which there is only one value of the dependent variable for each value of the independent variable | 7. | A quadratic function in the form of f(x)=a(x-h)+k is _____________ | 9. | Represents whether the parabola is stretched or compressed and the direction of opening | 11. | Used to multiply two binomials | 12. | Short for axis of symmetry | 15. | Horizontal translation | 17. | The values of x for which a relation has the value of zero | 18. | Relationship between two variables | 19. | The value of the dependent variable when the independent variable is zero | 21. | Vertical translation | 22. | The ______ of a polynomial with a single variable is the value of the highest exponent of the variable | 24. | The set of all values for which the independent variable is defined (x-value) | 25. | A quadratic function in the form of f(x)=a(x-r)(x-s) is _____________ |
| | Down:1. | Maximum/minimum point of the parabola | 3. | Least value taken by the dependent variable in a relation or function | 4. | Before factoring you must find the ___ | 5. | An algebraic expression with three terms | 6. | What is f(x) called | 8. | Write an expression in extended but equivalent form | 10. | Stands for Vertical Line Test; determines whether the graph is a function or not | 13. | The value of which a graph meets the x-axis | 14. | The set of all values of the dependent variable. All values are determined by the values in the domain. | 16. | A quadratic function in the form of f(x)=ax2+bx+c is _____________ | 20. | Letter or symbol that represents a number | 23. | to express a number as a product of 2 or more numbers, or an algebraic expression as product of two or more other algebraic equations |
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© 2015
PuzzleFast.com, Noncommercial Use Only