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What is the indicated z score if a graph depicts a standard normal variance with the mean 0 and standard deviation of 1?
For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.
What changes the position or orientation of a figure on a coordinate plane?
This is a transformation which could be a rotation, translation or reflection.
What happens to the coordinates when you reflect or rotate a point in the coordinate plane?
They will change according to the exact nature of the transformation.
Which transformation does not always result in congruent figures in the coordinate plane?
A transformation that does not always result in congruent figures in the coordinate plane is dilation. While dilations can resize figures, they change the dimensions of the original shape, leading to figures that are similar but not congruent. In contrast, transformations like translations, rotations, and reflections preserve the size and shape of the figures, resulting in congruence.
What transformation carries the regular pentagon below it self?
A translation which leaves the x-coordinate unchanged and subtracts a constant value from the y co-ordinate.
What is the difference between geometric transformation and coordinate transformation?
tumahri maa ki chut
When you perform a transformation of a figure on the coordinate plane the input of the transformation is called?
It is sometimes called the pre-image.
What is the position that is called the preimage?
It is usually a shape, on the coordinate plane, BEFORE a transformation.
What is the significance of the general coordinate transformation in the context of mathematical transformations?
The general coordinate transformation is important in mathematical transformations because it allows us to change the coordinates of a point in space without changing the underlying geometry or relationships between points. This transformation helps us analyze and understand complex mathematical problems in different coordinate systems, making it a powerful tool in various fields of mathematics and physics.
What is the indicated z score if a graph depicts a standard normal variance with the mean 0 and standard deviation of 1?
For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.For a N(0, 1) distribution, no linear transformation is necessary and so the z-score is the value of the coordinate on the horizontal axis.
What changes the position or orientation of a figure on a coordinate plane?
This is a transformation which could be a rotation, translation or reflection.
Can you describe the transformation using coordinate notation?
Yes, you can describe the transformation using coordinate notation. For example, if your coordinate notation is A(3,4)+(2,-2)---> A'(5, 2), you know that the "length"/x value increased and your y value/"height" decreased.
Which transformation moves every point of a figure the same distance and in the same direction on a coordinate plane.?
A translation.
What happens to the coordinates when you reflect or rotate a point in the coordinate plane?
They will change according to the exact nature of the transformation.
What rule describes a transformation across the Y-Axis?
Since the x coordinate will change, but not the y coordinate, take (x,y) and reflect across the y axis and you have (-x,y)
Conversion of coordinates from cassini soldner to UTM?
use global mapper>coordinate converter> then select input coordinate system and output coordinate system. make sure you pay close attention to datum, zone, greenwhich meridian value etc. Alternatively you can write a matlab program that reads from input excel/notepad file and converts it to desired coordinate based on the preset transformation parameters
What are some advantages to using the coordinate plane for transformation?
Transformations can be represented by simple algebraic functions. This allows you to study the transformed figure with ease.
