Science students consders experiements successful when the values that they measure or calculate have a percent error of no more than 10%. Max is calculating the density of silver (10.49 grammar per cm) Find the maximum and minimum values tha max could have calculated for the eexperiment to be considered successful
To determine the maximum and minimum values that Max could have calculated for the experiment to be considered successful, we need to consider the percent error criteria of no more than 10%.
First, let's calculate the true value of the density of silver using the given information:
True value = 10.49 g/cm^3
Next, let's calculate the maximum and minimum values that would correspond to a 10% error:
Maximum value = true value + (true value * 10%)
= 10.49 g/cm^3 + (10.49 g/cm^3 * 0.1)
= 10.49 g/cm^3 + 1.049 g/cm^3
= 11.54 g/cm^3
Minimum value = true value - (true value * 10%)
= 10.49 g/cm^3 - (10.49 g/cm^3 * 0.1)
= 10.49 g/cm^3 - 1.049 g/cm^3
= 9.441 g/cm^3
Therefore, the maximum value that Max could have calculated for the experiment to be considered successful is 11.54 g/cm^3, and the minimum value is 9.441 g/cm^3.