slove 1,2 and 3 Activity 1:By applying Kirchhoff's Voltage Law in an DC circuit with three loops. The three mesh currents(11, 12 and 13) can be characterized by the following equations:51₁ +5(1₁-1₂) - 30 = 05(1211) +21₂ +31₂ + 6(1₂-13) = 0-6(1312) + 413 = 0(1-A) Rearrange the above three equations into a standard matrix form.(1-B) Find I1, I2, and 13 using the inverse matrix method.(1-C) Find I1, I2, and 13 using the Gaussian elimination method.

By applying Kirchhoff's Voltage Law in an DC circuit with three loops. The three mesh currents (11, 12 and 13) can be characterized by the following equations: 51₁ +5(1₁-1₂) - 30 = 0 5(121₁) +21₂ +31₂ + 6(1₂−13) = 0 6(1312) + 413 = 0 (1-A) Rearrange the above three equations into a standard matrix form. (1-B) Find I1, I2, and 13 using the inverse matrix method. (1-C) Find I1, I2, and 13 using the Gaussian elimination method.

By applying Kirchhoff's Voltage Law in an DC circuit with three loops. The three mesh currents (11, 12 and 13) can be characterized by the following equations: 51₁ +5(1₁-1₂) - 30 = 0 5(121₁) +21₂ +31₂ + 6(1₂−13) = 0 6(1312) + 413 = 0 (1-A) Rearrange the above three equations into a standard matrix form. (1-B) Find I1, I2, and 13 using the inverse matrix method. (1-C) Find I1, I2, and 13 using the Gaussian elimination method.

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Question

slove 1,2 and 3

Activity 1:
By applying Kirchhoff's Voltage Law in an DC circuit with three loops. The three mesh currents
(11, 12 and 13) can be characterized by the following equations:
51₁ +5(1₁-1₂) - 30 = 0
5(1211) +21₂ +31₂ + 6(1₂-13) = 0
-
6(1312) + 413 = 0
(1-A) Rearrange the above three equations into a standard matrix form.
(1-B) Find I1, I2, and 13 using the inverse matrix method.
(1-C) Find I1, I2, and 13 using the Gaussian elimination method.

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