Answer
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(-10, -10)
(-9, -9)
(-8, -8)
(-7, -7)
(-6, -6)
(-5, -5)
(-4, -4)
(-3, -3)
(-2, -2)
(-1, -1)
(0, 0)
(1, 1)
(2, 2)
(3, 3)
(4, 4)
(5, 5)
(6, 6)
(7, 7)
(8, 8)
(9, 9)
(10, 10)
y-intercept = 0
-intercept = 0
Domain =
Range =
(-9, -9)
(-8, -8)
(-7, -7)
(-6, -6)
(-5, -5)
(-4, -4)
(-3, -3)
(-2, -2)
(-1, -1)
(0, 0)
(1, 1)
(2, 2)
(3, 3)
(4, 4)
(5, 5)
(6, 6)
(7, 7)
(8, 8)
(9, 9)
(10, 10)
y-intercept = 0
-intercept = 0
Domain =
Range =
↓Steps Explained:↓
With the function that you entered of consecutiveinteriorangles
plot points, determine the intercepts, domain, range
Since you did not specify a qualifying variable or function notation in your expression
we will assume y = consecutiveinteriorangles
Determine function type:
Since a collection of constants and variables raised to powers:
this is a polynomial function
Now Plot points from 10 to -10
| c | Plug in x | ƒ(c) = consecutiveinteriorangles | Ordered Pair |
|---|---|---|---|
| -10 | (-10)onse(-10)utiveinteriorangles | -10 | (-10, -10) |
| -9 | (-9)onse(-9)utiveinteriorangles | -9 | (-9, -9) |
| -8 | (-8)onse(-8)utiveinteriorangles | -8 | (-8, -8) |
| -7 | (-7)onse(-7)utiveinteriorangles | -7 | (-7, -7) |
| -6 | (-6)onse(-6)utiveinteriorangles | -6 | (-6, -6) |
| -5 | (-5)onse(-5)utiveinteriorangles | -5 | (-5, -5) |
| -4 | (-4)onse(-4)utiveinteriorangles | -4 | (-4, -4) |
| -3 | (-3)onse(-3)utiveinteriorangles | -3 | (-3, -3) |
| -2 | (-2)onse(-2)utiveinteriorangles | -2 | (-2, -2) |
| -1 | (-1)onse(-1)utiveinteriorangles | -1 | (-1, -1) |
| 0 | (0)onse(0)utiveinteriorangles | 0 | (0, 0) |
| 1 | (1)onse(1)utiveinteriorangles | 1 | (1, 1) |
| 2 | (2)onse(2)utiveinteriorangles | 2 | (2, 2) |
| 3 | (3)onse(3)utiveinteriorangles | 3 | (3, 3) |
| 4 | (4)onse(4)utiveinteriorangles | 4 | (4, 4) |
| 5 | (5)onse(5)utiveinteriorangles | 5 | (5, 5) |
| 6 | (6)onse(6)utiveinteriorangles | 6 | (6, 6) |
| 7 | (7)onse(7)utiveinteriorangles | 7 | (7, 7) |
| 8 | (8)onse(8)utiveinteriorangles | 8 | (8, 8) |
| 9 | (9)onse(9)utiveinteriorangles | 9 | (9, 9) |
| 10 | (10)onse(10)utiveinteriorangles | 10 | (10, 10) |
Determine the y-intercept:
The y-intercept is found when c is set to 0. From the grid above, our y-intercept is 0
Determine the c-intercept
The c-intercept is found when y is set to 0
The c-intercept is found when y is set to 0.
From the grid above, our x-intercept is 0
Determine the domain of the function:
The domain represents all values of c that you can enter
The domain is
Determine the range of the function:
The range is all the possible values of y or ƒ(c) that can exist
The range is
Final Answer
(-10, -10)(-9, -9)
(-8, -8)
(-7, -7)
(-6, -6)
(-5, -5)
(-4, -4)
(-3, -3)
(-2, -2)
(-1, -1)
(0, 0)
(1, 1)
(2, 2)
(3, 3)
(4, 4)
(5, 5)
(6, 6)
(7, 7)
(8, 8)
(9, 9)
(10, 10)
y-intercept = 0
-intercept = 0
Domain =
Range =
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Related Calculators: Function Test | Functions-Derivatives-Integrals | Quadratic Equations and Inequalities