Given,
{|\vec{a}+\vec{b}|}^{2}={|\vec{a}|}^{2}+2{|\vec{b}|}^{2}&\vec{a}\cdot \vec{b}=3
We know that
∣a+b∣2=∣a∣2+∣b∣2+2a⋅b
Now using the above formula in ∣a+b∣2=∣a∣2+2∣b∣2 we get,
∣a∣2+∣b∣2+2a⋅b=∣a∣2+2∣b∣2
Now on comparing both side we get, ∣b∣2=2a⋅b=6.........(1)
Also given ∣a×b∣2=75
⇒∣a∣2∣b∣2sin2θ=75
⇒∣a∣2∣b∣2(1−cos2θ)=75
⇒∣a∣2∣b∣2−∣a∣2∣b∣2cos2θ=75
⇒∣a∣2∣b∣2−(a⋅b)2=75
Now putting the value of ∣b∣2=2a⋅b=6 we get, 6∣a∣2−9=75⇒∣a∣2=14