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Question
Construct a 3 × 4 matrix, whose elements are given by:
`a_(ij) = 1/2 |-3i + j|`
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Solution
In general, a 3 × 4 matrix is given by A = `[(a_11, a_12, a_13, a_14), (a_21, a_22, a_23, a_24), (a_31, a_32, a_33, a_34)]`
`a_(ij) = 1/2 |-3i + j|, i = 1, 2, 3 and j = 1, 2, 3, 4`
∴ `a_11 = 1/2 |-3 xx 1 + 1|`
= `1/2 |-3 + 1|`
= `1/2 |-2|`
= `2/2`
= 1
`a_21 = 1/2 |-3 xx 2 + 1|`
= `1/2 |-6 + 1|`
=`1/2 |-5|`
= `5/2`
`a_31 = 1/2 |-3 xx 3 + 1|`
= `1/2| -9 + 1|`
= `1/2 |-8|`
= `8/2`
= 4
`a_12 = 1/2 |-3 xx 1 + 2|`
= `1/2 |-3 + 2|`
= `1/2 |-1|`
= 1
`a_22 = 1/2 |-3 xx 2 + 2|`
= `1/2 |-6 + 2|`
= `1/2 |-4|`
= `4/2`
= 2
`a_32 = 1/2 |-3 xx 3 + 2|`
= `1/2 |-9 + 2|`
= `1/2 |-7|`
= `7/2`
`a_13 = 1/2 |-3 xx 1 + 3|`
= `1/2 |-3 + 3|`
= 0
`a_23 = 1/2 |-3 xx 2 + 3|`
= `1/2 |-6 + 3|`
= `1/2 |-3|`
= `3/2`
`a_33 = 1/2 |-3 xx 3 + 3|`
= `1/2 |-9 + 3|`
= `1/2 |-6|`
= `6/2`
= 3
`a_14 = 1/2 |-3 xx 1 + 4|`
= `1/2 |-3 + 4|`
= `1/2 |1|`
= `1/2`
`a_24 = 1/2 |-3 xx 2 + 4|`
= `1/2 |-6 + 4|`
= `|-2|/2`
= `2/2`
= 1
`a_34 = 1/2 |-3 xx 3 + 4|`
= `1/2 |-9 + 4|`
= `1/2 |-5|`
= `5/2`
Therefore, the required matrix is A = `[(1, 1/2, 0, 1/2), (5/2, 2, 3/2, 1), (4, 7/2, 3, 5/2)]`.
