# Pure quadratic equation

Solve pure quadratic equation .

**Result****Leave us a comment of example and its solution (i.e. if it is still somewhat unclear...):**

**Showing 0 comments:**

**Be the first to comment!**

#### To solve this verbal math problem are needed these knowledge from mathematics:

## Next similar examples:

- Quadratic equation

Solve quadratic equation: 2x^{2}-58x+396=0 - EQ2

Solve quadratic equation: ? - Product

The product of two consecutive odd numbers is 8463. What are this numbers? - Quadratic equation

Quadratic equation ? has roots x_{1}= 80 and x_{2}= 78. Calculate the coefficients b and c. - Square Number

If to a square of integer number add 31, we get the square of next integer number. What is the original number? - Roots

Determine the quadratic equation absolute coefficient q, that the equation has a real double root and the root x calculate: ? - Quadratic equation

Find the roots of the quadratic equation: 3x^{2}-4x + (-4) = 0. - Discriminant

Determine the discriminant of the equation: ? - Fraction

For what x expression ? equals zero? - Square roots

What is equal to the product of the square roots of 295936? - Equation

Solve the equation: 1/2-2/8 = 1/10; Write the result as a decimal number. - Simple equation

Solve for x: 3(x + 2) = x - 18 - Candy

Peter had a sachet of candy. He wanted to share with his friends. If he gave them 30 candies, he would have 62 candies. If he gave them 40 candies, he would miss 8 candies. How many friends did Peter have? - Unknown number

Identify unknown number which 1/5 is 40 greater than one tenth of that number. - Fifth of the number

The fifth of the number is by 24 less than that number. What is the number? - Calculation

How much is sum of square root of six and the square root of 225? - Theorem prove

We want to prove the sentense: If the natural number n is divisible by six, then n is divisible by three. From what assumption we started?