A physical parameter `a` can be determined by measuring the parameters `b, c, d, and e` using the relation `a=b^(alpha)c^(beta)//d^(gamma)e^(delta)`. If the maximum errors in the measurement of `b, c , d, and e are b_(1) %,c_(1)% ,d_(1)% , and e_(1) %`, then the maximum error in the value of `a` determined by the experminent.

A physical parameter a can be determined by measuring the parameters b,c,d and e using the relation a = b^alpha c^beta //d^gamma e^delta . If the maximum errors in the measurement of b, c, d and e are b_1 % , c_1 % , d_1 % and e_1 % then the maximum error in the value of a determined by the experiment is (b_1+c_1+d_1+e_1)% (b_1+c_1-d_1-e_1)% (alphab_1+betac_1-gammad_1-deltae_1)% (alphab_1+betac_1+gammad_1+deltae_1)%

.A physical quantity P=A^(3)B^(2)/CD ,If the percentage errors in the measurement of A,B,C and Dare 1%,2%,3% and 4% then what is the maximum error in the measurement of P

A physical quantity P is described by the relation P=a^(1/2)b^(2)c^(3)d^(-4). If the relative errors in the measurements a, b, c and d respectively, are 2%, 1%, 3%, and 5%, then the relative error in P will be :

A physical quantity P is described by the relation P= a^(1/2)b^(2)c^(3)d^(-4) . If the relative errors in the measurement of a,b,c and d respectively, are 2%, 1%, 3% asd 5%, then the relative error in P will be :

A physical quantity P is described by the relation P=a^(1/2)b^(2)c^(3)d^(-4) If the relative errors in the measurement of a,b,c and d respectively,are 2%,1%,3%" and 5%" ,then the relative error in "P" will be :

A physical quantity P = a^3b^2/cd . If the percentageerrors in the measurement of a, b, c and d are 1%, 2%, 3% and 4% then the percentage error in P______.

Find the relative error in Z, if Z=A^(4)B^(1//3)//CD^(3//2) and the percentage error in the measurements of A,B,C and D are 4%,2%,3% and 1% respectively.