Let #P# be the amount invested at annual interest rate of #r%# for #t# number of years compounded #n# times a year - note that compounded every year means #n=1#; compounded every half-year means #n=2#; compounded every quarter means #n=4# and compounded every month means #n=12#.
then the amount after #t# years becomes #P(1+r/(100n))^(nt)#
We have #P=5000# euros, #r=4.5%#, #t=7# years and #n=12#
1.(a) Hence amount becomes #5000(1+4.5/1200)^84#
One can calculate it using a scientific calculator as this is
#5000(1+9/2400)^84=5000(1+3/800)^84#
= #5000xx1.00375^84=5000xx1.369452257=6847.261285#
or #6847.26# euros.
1.(b) Here we have #P=7000# euros, #r# is not known, #t=10# years and #n=1# and amount becomes #14000#, as it doubles and hence
#14000=7000(1+r/100)^10# or #(1+r/100)^10=14000/7000=2#
Hence taking log (base 10), #10log(1+r/100)=log2=0.301003#
or #log(1+r/100)=0.030103#
or #1+r/100=10^0.0301=1.07177#
hence #r/100=0.07177#
and #r=7.177%#
