In this worksheet, you will be defining 30 unique matrices denoted by the letters of the alphabet. Note that for each matrix size, the following conditions must me satisfied: Matrix sizes are as follows: • The first matrix must have all elements in whole numbers. It must contain negative, zero, and positive numbers. • The second matrix must have all elements in fraction form. The numerator and denominator should not exceed an absolute value of 10. You may use proper and improper fractions. Mixed fractions are not allowed. It must contain, negative, zero, and positive fractions. [B] • The third matrix must be in decimal form. The whole number part should be less than 10. The decimal part is limited to hundredths digit only. It must contain negative, zero, and positive decimals. [c]= A, B, C are 3 x 3 matrices D, E, F are 4 x 4 matrices G, H, I, are 5 x 5 matrices J, K, L, are 6 x 6 matrices N, O, are 3 x 4 matrices [4] = M, Examples: P, Q, R, are 4 x 2 matrices S, T, U, are 5 x 3 matrices V, W, X are 2 x 5 matrices YI, Y2, Y3 are column vectors with 3 elements Z1, Z2, Z3 are row vectors with 4 elements 1 -30 4 eles e 205 - of 0 -6 7 -5 10/100/ 1.12 0.65 -6.04 2.34 3.45 0.03 -9.01 5.12 0.00
In this worksheet, you will be defining 30 unique matrices denoted by the letters of the alphabet. Note that for each matrix size, the following conditions must me satisfied: Matrix sizes are as follows: • The first matrix must have all elements in whole numbers. It must contain negative, zero, and positive numbers. • The second matrix must have all elements in fraction form. The numerator and denominator should not exceed an absolute value of 10. You may use proper and improper fractions. Mixed fractions are not allowed. It must contain, negative, zero, and positive fractions. [B] • The third matrix must be in decimal form. The whole number part should be less than 10. The decimal part is limited to hundredths digit only. It must contain negative, zero, and positive decimals. [c]= A, B, C are 3 x 3 matrices D, E, F are 4 x 4 matrices G, H, I, are 5 x 5 matrices J, K, L, are 6 x 6 matrices N, O, are 3 x 4 matrices [4] = M, Examples: P, Q, R, are 4 x 2 matrices S, T, U, are 5 x 3 matrices V, W, X are 2 x 5 matrices YI, Y2, Y3 are column vectors with 3 elements Z1, Z2, Z3 are row vectors with 4 elements 1 -30 4 eles e 205 - of 0 -6 7 -5 10/100/ 1.12 0.65 -6.04 2.34 3.45 0.03 -9.01 5.12 0.00
Linear Algebra: A Modern Introduction
4th Edition
ISBN:9781285463247
Author:David Poole
Publisher:David Poole
Chapter2: Systems Of Linear Equations
Section2.2: Direct Methods For Solving Linear Systems
Problem 3CEXP
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