A sample of uranium mineral was found to contain `Pb^(208)` and `U^(238)` in the ratio of 0.008 : 1. Estimate the age of the mineral (half life of `U^(238)` is `4.51 xx 10^(9)` years).

In a smaple of rock, the ration .^(206)Pb to .^(238)U nulei is found to be 0.5. The age of the rock is (given half-life of U^(238) is 4.5 xx 10^(9) years).

(a) On analysis a sample of uranium ore was found to contain 0.277g of ._(82)Pb^(206) and 1.667g of ._(92)U^(238) . The half life period of U^(238) is 4.51xx10^(9) year. If all the lead were assumed to have come from decay of ._(92)U^(238) , What is the age of earth? (b) An ore of ._(92)U^(238) is found to contain ._(92)U^(238) and ._(82)Pb^(206) in the weight ratio of 1: 0.1 The half-life period of ._(92)U^(238) is 4.5xx10^(9) year. Calculate the age of ore.

The final product of U^(238) is Pb^(206) . A sample of pitchblende contains 0.0453 g of Pb^(206) for every gram of U^(238) present in it. Supposing that the mineral pitchblende formed at the time of formation of the earth did not contain any Pb^(206) , calculate the age of the earth (half-life period of U^(238) = 4.5 xx 10^(9) years).

A sample of U^(238) ("half life" = 4.5 xx 10^(9)yr) ore is found to contain 23.8 g" of " U^(238) and 20.6g of Pb^(206) . Calculate the age of the ore

The present day abundances (in moles) of the isotopes U^(238)andU^(235) are in the atio of 128 : 1. They have half lives of 4.5 xx 10^(9) years and 7 xx 10^(8) years respectively. If age of earth in (49X)/(76)xx10^(7) years, then calculate X (Assume equal moles of each isotope existed at the time of formation of the earth)

The half - life of ._6C^(14) , if its lamda is 2.31 xx10^(-4) " year"^(-1) is

A rock is 1.5 xx 10^(9) years old. The rock contains .^(238)U which disintegretes to form .^(236)U . Assume that there was no .^(206)Pb in the rock initially and it is the only stable product fromed by the decay. Calculate the ratio of number of nuclei of .^(238)U to that of .^(206)Pb in the rock. Half-life of .^(238)U is 4.5 xx 10^(9). years. (2^(1/3) = 1.259) .

The isotope of U^(238) and U^(235) occur in nature in the ratio 140:1 . Assuming that at the time of earth's formation, they were present in equal ratio, make an estimate of the age of earth. The half lives of U^(238) and U^(235) are 4.5xx10^9 years and 7.13xx10^8 years respectively. Given log_(10)140=2.1461 and log_(10)2=0.3010.

The atomic ratio between the uranium isotopes .^(238)U and.^(234)U in a mineral sample is found to be 1.8xx10^(4) . The half life of .^(234)U is T_((1)/(2))(234)=2.5xx10^(5) years. The half - life of .^(238)U is -

In an ore containing Uranium, the ratio of U^(238) to Pb^(206 nuceli is 3 . Calculate the age of the ore, assuming that alll the lead present in the ore is the final stable, product of U^(238) . Take the half-like of U^(238) to be 4.5 xx 10^(9) years. In (4//3) = 0.288 .