Statement I: If the two interfering waves have intensities in the ratio 9:4 the ratio of maximum to minimum amplitudes becomes 3:2.
Statement II. Maximum amplitude = `A_(1) +A_(2)` Minimum amplitude = `A_(1) - A_(2)`.
Also `I_(1)/I_(2) = (A_(1))^(2)/(A_(2))^(2)`

If ratio of amplitudes of two waves is 4:3 then ratio of maximum and minimum intensities is —

If a_(1) = 2 and a_(n) - a_(n-1) = 2n (n ge 2) , find the value of a_(1) + a_(2) + a_(3)+…+a_(20) .

Let A_(1), A_(2), A_(3), A_(4) be the areas of the triangular faces of a tetrahedron, and h_(1), h_(2), h_(3), h_(4) be the corresponding altitudes of the tetrahedron. If the volume of tetrahedron is 1//6 cubic units, then find the minimum value of (A_(1) +A_(2) + A_(3) + A_(4))(h_(1)+ h_(2)+h_(3)+h_(4)) (in cubic units).

Statement - I: Equation of bisectors of the angles between the liens x=0 and y=0 are y=+-x Statement - II : Equation of the bisectors of the angles between the lines a_(1)x+b_(1)y+c_(1)=0anda_(2)x+b_(2)y+c_(2)=0 are (a_(1)x+b_(1)y+c_(1))/(sqrt(a_(1)^(2)+b_(1)^(2)))=+-(a_(2)x+b_(2)y+c_(2))/(sqrt(a_(2)^(2)+b_(2)^(2))) (Provided a_(1)b_(2)nea_(2)b_(1)andc_(1),c_(2)gt0)

If A_(1), A_(2),..,A_(n) are any n events, then

If a_(1), a_(2), a_(3), …., a_(n) are in H.P., prove that, a_(1)a_(2) + a_(2)a_(3) + a_(3)a_(4) +…+ a_(n-1)a_(n) = (n-1)a_(1)a_(n)

A_(1), A_(2) and A_(3) are three events. Show that the simultaneous occurrence of the events is P(A_(1) cap A_(2) cap A_(3))=P(A_(1))P(A_(2)//A_(1))P[A_(3)//(A_(1) cap A_(2))] State under which condition P(A_(1) cap A_(2) cap A_(3))=P(A_(1))P(A_(2))P(A_(3))

If (1+x) ^(15) =a_(0) +a_(1) x +a_(2) x ^(2) +…+ a_(15) x ^(15), then the value of sum_(r=1) ^(15) r . (a_(r))/(a _(r-1)) is-

Find the coordinates of the centriod of the triangle whose vertices are ( a_(1), b_(1), c_(1)) , (a_(2), b_(2), c_(2)) and (a_(3), b_(3), c_(3)) .

In the triangle ABC, two sides b,c and angle B are given, side a has two values a_(1) and a_(2) . Show that |(a_(1)-a_(2))|=2sqrt(b^(2)-c^(2)sin^(2)B) .