Home
Class 10
MATHS
In a Geometric progression the sum of fi...

In a Geometric progression the sum of first three terms is 14 and the sum of next three terms of it is 112. Find the Geometric progression.

Answer

Step by step text solution for In a Geometric progression the sum of first three terms is 14 and the sum of next three terms of it is 112. Find the Geometric progression. by MATHS experts to help you in doubts & scoring excellent marks in Class 10 exams.

Doubtnut Promotions Banner Mobile Dark
|

Topper's Solved these Questions

  • SSLC KARNATAKA TOPPERS' ANSWERS MARCH 2018 Class-X

    OSWAAL PUBLICATION|Exercise SECTION-E |4 Videos
  • SSLC KARNATAKA TOPPERS' ANSWERS MARCH 2018 Class-X

    OSWAAL PUBLICATION|Exercise SECTION-C |18 Videos
  • SOME APPLICATION OF TRIGONOMETRY

    OSWAAL PUBLICATION|Exercise TEXTBOOK CORNER EXERCISE 12.1|16 Videos
  • STATISTICS

    OSWAAL PUBLICATION|Exercise TEXTBOOK CORNER (EXERCISE 13.4)|3 Videos

Similar Questions

Explore conceptually related problems

In an arithmetic progression of 50 terms, the sum of first ten terms is 210 and the sum of last fifteen terms is 2565. Find the arithmetic progression.

In an arithmetic progression of 50 terms, the sum of first ten terms is 210 and the sum of last fifteen terms is 2565. Find the arithmetic progression.

The sum of first 7 terms of an AP is 63 and the sum of next 7 terms is 161. Find a_(28) .

The sum of the fourth and eighth terms of an arithmetic progression is 24 and the sum of the sixth and tenth terms is 44. Find the first three terms of the Arithmetic progression.

In and AP, the sum of the first 10 terms is -150 and sum of the next ten terms is -550. Find the AP.

An aritmetic progression consists of three terms whose sum is 15 and sum of the squares of extremes is 58. Find the terms of progression.

The sum o the fourth and eighth terms of arithmetic progression is 24 and the sum of the sixth and tenth terms is 44. Find the first three terms of the Arithmetic progression:

The first two terms of a geometric progression add upto 12. The sum of the third and the fourth term is 48.If the terms of the geometric progression are alternatively positive and negative, then the first term is :

In arithmetic sequence the sum of first nine terms 279 and the sum of first twenty terms is 1280 then. write the sequence.

There are five terms in an arrithmetic progression. the Sum of these terms is 55, and the fourth term is five more than the sum of the first two terms.Find the terms of the Arithmaetic progression.