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Question

Prove that the following sets of three lines are concurrent:
(i) 15x − 18y + 1 = 0, 12x + 10y − 3 = 0 and 6x + 66y − 11 = 0

(ii) 3x − 5y − 11 = 0, 5x + 3y − 7 = 0 and x + 2y = 0

(iii) xa+yb=1,xb+ya=1 and y=x.

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Solution

(i) Given:
15x − 18y + 1 = 0 ... (1)

12x + 10y − 3 = 0 ... (2)

6x + 66y − 11 = 0 ... (3)

Now, consider the following determinant:

15-1811210-3666-11=15-110+198+18-132+18+1792-60

15-1811210-3666-11=1320-2052+732=0

Hence, the given lines are concurrent.

(ii)

Given:
3x − 5y − 11 = 0 ... (1)

5x + 3y − 7 = 0 ... (2)

x + 2y = 0 ... (3)

Now, consider the following determinant:

3-5-1153-7120=3×14+5×7-11×7=0

Hence, the given lines are concurrent.

(iii)

Given:
bx+ay-ab=0 ... (1)

ax+by-ab=0 ... (2)

x − y = 0 ... (3)

Now, consider the following determinant:

ba-abab-ab1-10=-b×ab-a×ab-ab×-a-b=0

Hence, the given lines are concurrent.

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