Solve (((20-10)\times10)/((80-50)+(100-30))+100)/((20+(40\times2))/((10/5)\times20)+100)= | Equatix - Math Solver

Fractions & Decimals

Ratios & Proportions

Basic Number Theory

Integers & Absolute Values

Factors & Multiples

Prime Factorization

Basic Equations & Inequalities

Coordinate Plane & Graphing

Linear Equations & Inequalities

Quadratic Equations

Polynomials & Factoring

Functions & Graphs

Systems of Equations

Trigonometric Functions

Trigonometric Identities & Equations

Right Triangle Trigonometry

Graphing Trigonometric Functions

Limits & Continuity

Derivatives & Applications

Integrals & Applications

Series & Sequences

Multivariable Calculus

Functions & Graphs

Polynomial & Rational Functions

Exponential & Logarithmic Functions

Sequences & Series

Descriptive Statistics

Normal Distribution

Hypothesis Testing

Regression Analysis

Linear Programming

Sets & Counting

Eigenvalues & Eigenvectors

Linear Transformations

Atomic Structure

Thermochemistry

Example

3(r+2s)=2t-4

a⋅(b-2)=3b

3(r+2s)=2t-4

a⋅(b-2)=3b

Question

$$\frac{ \frac{ (20-10) \times 10 }{ (80-50)+(100-30) } +100 }{ \frac{ 20+(40 \times 2) }{ (10/5) \times 20 } +100 } =$$

Evaluate

$\frac{202}{205}\approx 0.985365854$

Solution Steps

Subtract $10$ from $20$ to get $10$.

$$\frac{\frac{10\times 10}{80-50+100-30}+100}{\frac{20+40\times 2}{\frac{10}{5}\times 20}+100}$$

Multiply $10$ and $10$ to get $100$.

$$\frac{\frac{100}{80-50+100-30}+100}{\frac{20+40\times 2}{\frac{10}{5}\times 20}+100}$$

Subtract $50$ from $80$ to get $30$.

$$\frac{\frac{100}{30+100-30}+100}{\frac{20+40\times 2}{\frac{10}{5}\times 20}+100}$$

Add $30$ and $100$ to get $130$.

$$\frac{\frac{100}{130-30}+100}{\frac{20+40\times 2}{\frac{10}{5}\times 20}+100}$$

Subtract $30$ from $130$ to get $100$.

$$\frac{\frac{100}{100}+100}{\frac{20+40\times 2}{\frac{10}{5}\times 20}+100}$$

Divide $100$ by $100$ to get $1$.

$$\frac{1+100}{\frac{20+40\times 2}{\frac{10}{5}\times 20}+100}$$

Add $1$ and $100$ to get $101$.

$$\frac{101}{\frac{20+40\times 2}{\frac{10}{5}\times 20}+100}$$

Multiply $40$ and $2$ to get $80$.

$$\frac{101}{\frac{20+80}{\frac{10}{5}\times 20}+100}$$

Add $20$ and $80$ to get $100$.

$$\frac{101}{\frac{100}{\frac{10}{5}\times 20}+100}$$

Divide $10$ by $5$ to get $2$.

$$\frac{101}{\frac{100}{2\times 20}+100}$$

Multiply $2$ and $20$ to get $40$.

$$\frac{101}{\frac{100}{40}+100}$$

Reduce the fraction $\frac{100}{40}$ to lowest terms by extracting and canceling out $20$.

$$\frac{101}{\frac{5}{2}+100}$$

Convert $100$ to fraction $\frac{200}{2}$.

$$\frac{101}{\frac{5}{2}+\frac{200}{2}}$$

Since $\frac{5}{2}$ and $\frac{200}{2}$ have the same denominator, add them by adding their numerators.

$$\frac{101}{\frac{5+200}{2}}$$

Add $5$ and $200$ to get $205$.

$$\frac{101}{\frac{205}{2}}$$

Divide $101$ by $\frac{205}{2}$ by multiplying $101$ by the reciprocal of $\frac{205}{2}$.

$$101\times \frac{2}{205}$$

Express $101\times \frac{2}{205}$ as a single fraction.

$$\frac{101\times 2}{205}$$

Multiply $101$ and $2$ to get $202$.

$$\frac{202}{205}$$

Factor

$\frac{2 \cdot 101}{5 \cdot 41} = 0.9853658536585366$