If →a,→b are unit vectors such that the vector →a+3→b is perpendicular to 7→a−5→b and →a−4→b is perpendicular to 7→a−2→b,then the angle between →a and →b is
A
π6
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B
π4
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C
π3
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D
π2
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Solution
The correct option is Cπ3 We have (→a+3→b)⊥(7→a−5→b)⇒(→a+3→b).(7→a−5→b)=0⇒7|→a|2+16(→a.→b)−15|→b|2=0⇒7+16cosθ−15=0⇒cosθ=12⇒θ=π3 and (→a−4→b)⊥(7→a−2→b) ⇒(→a−4→b).(7→a−2→b)=0⇒7|→a|2+8|→b|2−30(→a.→b)=0⇒15−30cosθ=0⇒cosθ=12⇒θ=π3