Solve for x to five-figure accuracy: 2 x 1 + 0.13 × 92 365 + x ( 1 + 0.13 × 59 365 ) = $ 831 \frac{2 x}{1+0.13 imes \frac{92}{365}}+x\left(1+0.13 imes \frac{59}{365} ight)=\$ 831 1 + 0.13 × 365 92 2 x + x ( 1 + 0.13 × 365 59 ) = $831

Question

Solve for x to five-figure accuracy: 2 x 1 + 0.13 × 92 365 + x ( 1 + 0.13 × 59 365 ) = $ 831 \frac{2 x}{1+0.13 	imes \frac{92}{365}}+x\left(1+0.13 	imes \frac{59}{365}ight)=\$ 831 1 + 0.13 × 365 92 ​ 2 x ​ + x ( 1 + 0.13 × 365 59 ​ ) = $831

Samuel Melek · Accepted Answer

Final Answer :  $280.97

Solve for x to five-figure accuracy:
$2x1+0.13×92365+x(1+0.13×59365)=$831\frac{2 x}{1+0.13 \times \frac{92}{365}}+x\left(1+0.13 \times \frac{59}{365}\right)=\$ 831$

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Solve for x to five-figure accuracy: 2x1+0.13×92365+x(1+0.13×59365)=$831\frac{2 x}{1+0.13 \times \frac{92}{365}}+x\left(1+0.13 \times \frac{59}{365}\right)=\$ 8311+0.13×36592​2x​+x(1+0.13×36559​)=$831

Definitions

Learning Objectives

Learning Objectives

Related questions

Solve for x to five-figure accuracy:
$2x1+0.13×92365+x(1+0.13×59365)=$831\frac{2 x}{1+0.13 \times \frac{92}{365}}+x\left(1+0.13 \times \frac{59}{365}\right)=\$ 831$