alg 2 ch 1 linear functions
graph the function g(x) = x + 4 and its parent function. Then describe the transformation
check graph with desmo;the graph of g(x) is a vertical translation of 4 units up of the graph of the parent linear function
graph the function h(x) = 3 ∣x ∣ and its parent function. Then describe the transformation.
check graph with desmo;the graph of h(x) = 3 ∣x ∣ is a vertical stretch by a factor of 3 of the graph of the parent absolute value function
graph the function h(x) =3/4x and its parent function. Then describe the transformation.
check graph with desmo;the graph of h(x)=3/4x is a vertical shrink by a factor of 3/4 of the graph of the parent linear function
write a function g whose graph represents the indicated transformation of the graph of f. Use a graphing calculator to check your answer. f(x) = x − 5; translation 4 units to the left
g(x)= (x+4)-5 or g(x)= x-1
write a function g whose graph represents the indicated transformation of the graph of f. Use a graphing calculator to check your answer. f(x) = −3 + ∣x − 11 ∣ ; reflection in the y-axis
g(x)= -3 +∣-x - 11∣
write a function g whose graph represents the indicated transformation of the graph of f. Use a graphing calculator to check your answer. f(x) = x + 2; vertical stretch by a factor of 5
g(x)= 5x + 10
write a function g whose graph represents the indicated transformation of the graph of f. Use a graphing calculator to check your answer. f(x) = ∣2x ∣ + 4; horizontal shrink by a factor of 1/2
g(x)= ∣4x∣ + 4
write a function g whose graph represents the indicated transformation of the graph of f. Use a graphing calculator to check your answer. f(x) = ∣6x ∣ − 2; reflection in the y-axis
g(x)=∣6x∣-2
do what's my line wkst
have fun :)
Use a graphing calculator to graph the function f(x) = −(x + 3)² + 1/4 and its parent function. Then describe the transformations.
the graph of f(x) = −(x + 3)^2 + 1/4 is a reflection, a vertical translation up 1/4 , and a horizontal translation of 3 to the left of the graph of the parent quadratic function
Use a graphing calculator to graph the function h(x) = −3 ∣x ∣ − 1 and its parent function. Then describe the transformations.
the graph of h(x) = −3 ∣x ∣ − 1 is a vertical stretch by a factor of 3, a horizontal reflection, and a vertical translation down 1 unit of the graph of the parent absolute value function
do piecewise functions wkst
you'll do sensationally ;)
