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| rev | Admin | (Created page with "'''Answer: C''' Let <math>P</math> be the annual net premium at <math>x+1</math>. Also, let <math>A_{y}^{*}</math> be the expected present value for the special insurance described in the problem issued to <math>(y)</math>. <math>P \ddot{a}_{x+1}=1000 \sum_{k=0}^{\infty}(1.03)^{k+1} v_{k \mid}^{k+1} q_{x+1}=1000 A_{x+1}^{*}</math> We are given <math>110 \ddot{a}_{x}=1000 \sum_{k=0}^{\infty}(1.03)^{k+1} v^{k+1}{ }_{k} q_{x}=1000 A_{x}^{*}</math> Which implies that <...") | Jan 19'24 at 21:41 | +838 |