In the given figure, each of PA, QB and RC is perpendicular to Ac. If `AP=x,QB=z, RC=y, AB=a and BC=b`, show that `(1)/(x)+(1)/(y)=(1)/(z)`

In the given figure, PA, QB and RC each is perpendicular to AC such that PA=x, RC=y, QB=z, AB=a, and BC=b Prove that (1)/(x)+(1)/(y)=(1)/(z)

AB, CD, PQ are perpendicular to BD. If AB = x, CD = y and PQ = z prove that (1)/(x) + (1)/(y) = (1)/(z)

AB, CD, PQ are perpendicular to BD. If AB = x, CD = y and PQ = z prove that (1)/(x) + (1)/(y) = (1)/(z)

AB, CD, PQ are perpendicular to BD. If AB = x, CD = y and PQ = z prove that (1)/(x) + (1)/(y) = (1)/(z)

In the adjoint figure,m each of the of the segments PA, QB, RC and SD is perpendicular to l. If AB =6, BC=9, CD=12, PS=36, then determine PQ, QR and RS.

In the above figure, seg PA, seg QB and seg RC are perpendicular to seg AC. From the information given in the figure, prove that: (1)/(x) + (1)/(z) = (1)/(y)

AB,CD,PQ are perpendicular to BD. AB=x. CD=y and PQ=z, prove that 1/x+1/y=1/z .

If a^(x)=b^(y)=c^(z) and b^(2)=ac prove that (1)/(x)+(1)/(z)=(2)/(y)

a^(x)=b^(y)=c^(z) and b^(2)=ac then prove that (1)/(x)+(1)/(z)=(2)/(y)