1.If two vectors A⃗\vec{A}A and B⃗\vec{B}B are mutually perpendicular, then the component of A⃗−B⃗\vec{A} - \vec{B}A−B along the direction of A⃗+B⃗\vec{A} + \vec{B}A+B isa.∣A∣2+∣B∣2\sqrt{|A|^2 + |B|^2}∣A∣2+∣B∣2b.∣A∣2−∣B∣2\sqrt{|A|^2 - |B|^2}∣A∣2−∣B∣2c.∣A∣2−∣B∣2∣A∣2+∣B∣2\frac{|A|^2 - |B|^2}{\sqrt{|A|^2 + |B|^2}}∣A∣2+∣B∣2∣A∣2−∣B∣2d.∣A∣2+∣B∣2∣A∣2−∣B∣2\frac{|A|^2 + |B|^2}{\sqrt{|A|^2 - |B|^2}}∣A∣2−∣B∣2∣A∣2+∣B∣2Login to continueOnly logged in users canattempt or see the solution.