3. The following diagram shows a training set with four negative points (green c

Question

3. The following diagram shows a training set with four negative points (green circles) and four positive points (purple squares) (46) (6,6) (44) (6,4) It has no useful linear separating boundary, but the following nonlinear transformation turns points (x12) in the space shown to points in another space, which we shall call (V1V2). The transformation is V1 (x1 In the Vi2) space, something very convenient happens. All the negative points are mapped to the point (1,1), and all the positive points are mapped to the point (25,25) Your task is to find the maximum-margin separator in the (V1J2) space (the transformed space). Then, determine which new points in the original (x12) space would be classified as positive, and which would be classified as negative. That is, what curve in the original space transforms to the straight-line boundary in the transformed space? Identify the true statement in the list of choices below O a) (10,4) is classified as negative O b) (6,0) is classified as positive O c) (9,2) is classified as negative O d) (10,5) is classified as positive

Explanation / Answer

Answer:

First of all transformation space can not termed as the negative space as because of the y1 and y2 are to squares after the subtraction.

And after the calculation the point (10, 5) is classified as positive.

As (6,0) can not get from us in above given graph.

Option D

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