Given,
a=3i^+j^−k^ and c=2i^−3j^+3k^.
And b is a vector such that a=b×c and ∣b∣2=50,
Now solving, ∣a∣=∣b×c∣
⇒32+12+12=∣b∣⋅22+32+32⋅sinθ
⇒11=50⋅22⋅sinθ
∴sinθ=101 or cosθ=1099
Now solving,∣72−∣b+c∣2∣ we get,
∣72−∣b+c∣2∣
=∣72−(∣b∣2+∣c∣2+2∣b∣∣c∣cosθ)∣
=∣72−(50+22+2×52.221099)∣
=∣72−(72+102×5×2×11×3∣
=∣66∣=66