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Assuming you meant y=x2 & y=x2-4
They are both straight-line graphs, however - they produce different results. Using the values of 1,2,3,4 & 5 for x (as an example)...
In the first equation, the value of y would be 1,4,8,16 & 25
In the second equation, y would be -3,0,4,12 & 21
What else can I help you with?
What is the effect on the graph of the equation y equals x2 plus 2 when it is changed to y equals x2 - 4?
the graph is moved down 6 units
1 plus x plus x2 plus x3 plus x4 plus plus x24 equals 49x25?
No.
How do you graph y equals x2?
The graph is a parabola facing (opening) upwards with the vertex at the origin.
How many x intercepts does the graph of y equals x2 have?
One. It is a double root.
Is y equals x2 a function?
Y=X^2 is a function for it forms a parabola on a graph.
What describes the translation of the graph of y equals x2 to obtain the graph of y equals -x2 - 3?
No translation will invert a quadratic graph.
What is the effect on the graph of the equation y equals x2 plus 2 when it is changed to y equals x2 - 4?
the graph is moved down 6 units
1 plus x plus x2 plus x3 plus x4 plus plus x24 equals 49x25?
No.
What is the graph of y equals x2-7?
9
How do you graph y equals x2?
The graph is a parabola facing (opening) upwards with the vertex at the origin.
Which picture shows the correct graph of x2 equals 100?
a dot
What is the transformation of the graph of y equals x2 to obtain the graph of y equals -x2 plus 3?
First, reflect the graph of y = x² in the x-axis (line y = 0) to obtain the graph of y = -x²; then second, shift it 3 units up to obtain the graph of y = -x² + 3.
How many x intercepts does the graph of y equals x2 have?
One. It is a double root.
Is y equals x2 a function?
Y=X^2 is a function for it forms a parabola on a graph.
What is graph of the function y equals X2?
It looks like a parabola which looks like a U shape.
How do you graph x2 plus y2 equals 9?
Draw a circle with its center at the origin and a radius of 3.
X2 plus y2 equals 4?
The graph of that equation is a circle, centered at the origin, with radius = 2 .
