💬 👋 We’re always here. Join our Discord to connect with other students 24/7, any time, night or day.Join Here!

Get the answer to your homework problem.

Try Numerade free for 7 days

Like

Report

The $5^{\text {th }}, 8^{\text {th }}$ and $11^{\text {th }}$ terms of a G.P. are $p, q$ and $s$, respectively. Show that $q^{2}=p s$.

Precalculus

Chapter 9

Sequences and Series

Section 3

Series

Introduction to Sequences and Series

Campbell University

Boston College

Utica College

Lectures

07:16

In mathematics, a continuo…

04:09

01:19

Show that $p | q$ and $q |…

00:45

Show that if $p, q,$ and $…

02:35

Show that if $R$ and $S$ a…

01:08

Prove that if $p, m,$ and …

00:52

Show that $(p \rightarrow …

01:50

02:00

Show that $(p \wedge q) \r…

01:12

03:06

Show that the propositions…

01:46

Tell whether the expressio…

00:46

$D_{O, k}$ maps $\overline…

01:40

Show that if $C_{1}$ and $…

11:50

02:51

02:23

Show that $p \downarrow q$…

01:35

Show that $p | q$ is logic…

03:16

Prove that $\overrightarro…

03:58

Show that $(p \vee q) \wed…

02:57

02:50

Hello. We have problem. # three in this problem It has given that 58 and 11 term r. p. q. and S. So 1/5 is P. Which means a artist to the par four equal to Because we'll be using the formula and equal to a artist to the power and management. There is the first time in our is the common issue. A 58 is Q. Which means A. Are raised to the Power seven equal to Q. and 11 equal to our. Which means this is as thank God to get this is yes. Okay. A. Are there to the power 10 equal to us? Okay. So we have to find we have to show that us quite equal to P. S. So we have to show us quite equal to P. S. So let us square it up. So this will be pure square A. R. to the Power seven. Hold Square That is a square arrested for 14. So you're square will be equal to he are raised to the power, let's say for into a artist about 10 A. R. S. Bar for equal to P. And this is equal to s so curious square. Equal to be as this is brewed. Thank you.

View More Answers From This Book

Find Another Textbook

Numerade Educator

In mathematics, a continuous function is a function for which sufficiently s…

Show that $p | q$ and $q | p$ are equivalent.

Show that if $p, q,$ and $r$ are compound propositions such that $p$ and $q$…

Show that if $R$ and $S$ are both $n$ -ary relations, then $P_{i_{1}, i_{2},…

Prove that if $p, m,$ and $q$ are consecutive terms in an arithmetic sequenc…

Show that $(p \rightarrow q) \rightarrow(r \rightarrow s)$ and $(p \rightarr…

Show that $(p \rightarrow q) \rightarrow r$ and $p \rightarrow(q \rightarrow…

Show that $(p \wedge q) \rightarrow r$ and $(p \rightarrow r) \wedge(q \righ…

Prove that if $p, m,$ and $q$ form an arithmetic sequence, then$$m=\frac{p+q…

Show that the propositions $p_{1}, p_{2}, p_{3},$ and $p_{4}$ can be shown t…

Tell whether the expressions in each pairing are equivalent. Then explain wh…

$D_{O, k}$ maps $\overline{P Q}$ to $\overline{P^{\prime} Q^{\prime}}$.a…

Show that if $C_{1}$ and $C_{2}$ are conditions that elements of the $n$ -ar…

Show that $(p \rightarrow q) \wedge(q \rightarrow r) \rightarrow(p \rightarr…

Show that $p \downarrow q$ is logically equivalent to $\neg(p \vee q)$

Show that $p | q$ is logically equivalent to $\neg(p \wedge q)$

Prove that $\overrightarrow{R S}$ and $\overrightarrow{P Q}$ are equivalent …

Show that $(p \vee q) \wedge(\neg p \vee r) \rightarrow(q \vee r)$ is a taut…

02:25

Integrate the functions.$$\frac{x e^{x}}{(1+x)^{2}}$$

03:09

Find the coordinates of the foci, the vertices, the length of major axis, th…

03:25

Find a G.P. for which sum of the first two terms is $-4$ and the fifth term …

04:12

Evaluate the following definite integrals as limit of sums.$$\int_{0…

03:38

Find the equation of the set of points $\mathrm{P}$, the sum of whose distan…

01:20

Find the equation of the parabola that satisfies the given conditions:Ve…

01:31

An experiment consists of rolling a die and then tossing a coin once if the …

01:41

Find the equation of the parabola that satisfies the given conditions:Fo…

04:06

Find equation of the line passing through the point $(2,2)$ and cutting off …

Find the angle between the $x$ -axis and the line joining the points $(3,-1)…