
Clearly, x=211 intersect x+y−11=0 at (211,211) and 2x+3y−29=0 at (211,6)⇒α=[211,6] αmin⋅αmax=211⋅6=33
Let the points (211,α) lie on or inside the triangle with sides x+y=11,x+2y=16 and 2x+3y=29. Then the product of the smallest and the largest values of α is equal to :
Held on 24 Jan 2025 · Verified 6 Jul 2026.
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