# Q of GP

Calculate quotient of geometric progression if a1=5 a a1+a2=12.

**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 example are needed these knowledge from mathematics:

## Next similar examples:

- Geometric progression 2

There is geometric sequence with a_{1}=5.7 and quotient q=-2.5. Calculate a_{17}. - Reciprocal

Calculate reciprocal of z=0.8+0.6i: - Quotient

Determine the quotient and the second member of the geometric progression where a3=10, a1+a2=-1,6 a1-a2=2,4. - Piano

If Suzan practicing 10 minutes at Monday; every other day she wants to practice 2 times as much as the previous day, how many hours and minutes will have to practice on Friday? - Five members

Write first 5 members geometric sequence and determine whether it is increasing or decreasing: a_{1}= 3 q = -2 - Coefficient

Determine the coefficient of this sequence: 7.2; 2.4; 0.8 - The city

At the end of 2010 the city had 155000 residents. The population increased by 2.1% each year. What is the population at the end of 2013? - Six terms

Find the first six terms of the sequence a1 = -3, an = 2 * an-1 - Sequence

Find the common ratio of the sequence -3, -1.5, -0.75, -0.375, -0.1875. Ratio write as decimal number rounded to tenth. - Sequence 2

Write the first 5 members of an arithmetic sequence a_{11}=-14, d=-1 - Expression with powers

If x-1/x=5, find the value of x^{4}+1/x^{4} - Holidays - on pool

Children's tickets to the swimming pool stands x € for an adult is € 2 more expensive. There was m children in the swimming pool and adults three times less. How many euros make treasurer for pool entry? - Three workshops

There are 2743 people working in three workshops. In the second workshop works 140 people more than in the first and in third works 4.2 times more than the second one. How many people work in each workshop? - 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? - Chords

How many 4-tones chords (chord = at the same time sounding different tones) is possible to play within 7 tones? - Teams

How many ways can divide 16 players into two teams of 8 member? - Reference angle

Find the reference angle of each angle: