1. Problem 1Objective:To draw a sphere with R(^2).Procedure:To consider a vector xP norms are declared from 1 to 100(fassumption)Unit sphere is drawn ( [X,Y,Z] = sphere(...))The parameters are fed into the sphere and the output values are extracted as X,Y and Z2. Problem 2Procedure with objectives :Xa and Xb are vectors initializedMatrices are declared with finite dimensionsEquivalency of the matrices should be positive(statisfied)Equality condition of the matrices should not be positive(not statisfied)a. The X(infinity), Xb and Kth root of X(infinity) should be dicreased respectivelyb. X(infinity) and X(2) should be euqivqalent--The X(1,2,....(infinity)) matrices are created--The Kth root of the X(infinity) is estimated--The region among the X(2) and X(infinity) should be developed and createdc. Two vectors are equivalent the normal in matrices are also equivalent -The vectors are created -The variables are estimated with a time period value say 3,6,10 values are considered --The matrices developed and the variables with prescribed values are considered and developed with the work accordingly --The evaluation of the work is verified by creating a function to check the equivalency of the workd. Same steps of (c) is followed but the Non zero matrices have to be considered --The non-zero matrices with equality and non-equality are to be separated --The function have to be developed to estimate the equality of the producte. A matrix and A transpose matrix is equivalent have to be proved --Here we deploy a X1,X2,X3 matrix in the row1
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