b_2=b_1\cdot q=b_1\cdotc q^{2-1}\\
\left \{ {{b_1+b_3=10} \atop {b_2+b_4=20}} \right. \\
b_1-?;\\
\left \{ {{b_1+b_1\cdot q^2=10} \atop {b_1\cdot q+b_1\cdot q^3=20}} \right. ;\\
\left \{ {{b_1\cdot(1+q^2)=10;} \atop {b_1\cdot q\cdot(1+q^2)}=20;} \right.\\
\frac{b_1\cdot q\cdot(1+q^2)}{b_1\cdot(1+q^2)}=\frac{20}{10};\\
q=2;\\
b_1+b_1\cdot2^2=10;\\
b_1\cdot(1+4)=10;\\" alt="b_n=b_1\cdot q^{n-1};==>b_2=b_1\cdot q=b_1\cdotc q^{2-1}\\
\left \{ {{b_1+b_3=10} \atop {b_2+b_4=20}} \right. \\
b_1-?;\\
\left \{ {{b_1+b_1\cdot q^2=10} \atop {b_1\cdot q+b_1\cdot q^3=20}} \right. ;\\
\left \{ {{b_1\cdot(1+q^2)=10;} \atop {b_1\cdot q\cdot(1+q^2)}=20;} \right.\\
\frac{b_1\cdot q\cdot(1+q^2)}{b_1\cdot(1+q^2)}=\frac{20}{10};\\
q=2;\\
b_1+b_1\cdot2^2=10;\\
b_1\cdot(1+4)=10;\\" align="absmiddle" class="latex-formula">
первій член прогрессии равен 2