Given, a=2i^−j^+5k^,b=αi^+βj^+2k^
Also given ((a×b)×i^)⋅k^=223, then ∣b×2j^∣ is
Now using triple cross product we have, ((a⋅i^)b−(b⋅i^)a)⋅k^=223
⇒(2.b−α⋅a).k^=223
⇒2×2−α×5=223
⇒5α=4−223
⇒α=2−3
Now finding, b×2j^=∣i^α0j^β2k^20∣=−4i^+2αk^
∴∣b×2j^∣=16+4α2=16+4×49=5