Question 1

If x/a =y/b=z/c prove the follong photo

Question 2

Answer:

See Explanation

Explanation:

Given

(x)/(a)= (y)/(b) =(z)/(c)

$Let \: (x)/(a)= (y)/(b) =(z)/(c)=m$

(where m is any constant)

$\implies$

$(x)/(a)=m\implies x =am$

$(y)/(b)=m\implies y =bm$

$(z)/(c)=m\implies z =cm$

To Prove:

(ax-by)/((a+b)(x-y))+(by-cz)/((b+c)(y-z))=2

LHS
=(ax-by)/((a+b)(x-y))+(by-cz)/((b+c)(y-z))

(Plug the values of x, y and z in the form of am, bm and cm respectively in the LHS)

=(a(am)-b(bm))/((a+b)(am-bm))+(b(bm)-c(cm))/((b+c)(bm-cm))

=(a^2m-b^2m)/((a+b)m(a-b))+(b^2m-c^2m)/((b+c)m(b-c))

=(m(a^2-b^2))/(m(a+b)(a-b))+(m(b^2-c^2))/(m(b+c)(b-c))

$=\frac{\cancel{m(a^2-b^2)}}{\cancel{m(a^2-b^2)}}+\frac{\cancel{m(b^2-c^2)}}{\cancel{m(b^2-c^2)}}$

= 1 + 1

= 2

= RHS

$\implies \purple{\bold{(ax-by)/((a+b)(x-y))+(by-cz)/((b+c)(y-z))}}=\red{\bold{2}}$

Thus proved

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