Hellooooooooooooo
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- Jan 20, 2022
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Find the value of P and Q if p-1, q-1 and q+10 are in AP
Please show us what you have tried and exactly where you are stuck.Find the value of P and Q if p-1, q-1 and q+10 are in AP
If P and p are supposed to be the same, please use the same case.Find the value of P and Q if p-1, q-1 and q+10 are in AP
What two quantities must be the same if these three numbers are in AP? Write that equation.Find the value of p and q if p-1, q-1 and q+10 are in AP
Hi Hellooooooooooooo. Given an arithmetic progression {p-1, q-1, q-11}, you could express p in terms of q, by first subtracting the progression's common difference from the middle element. Doing that yields an expression for the first element in terms of q, forming an equation to solve for p.Find the [values]
Have you understood that we have told you this doesn't have an answer, because there are many pairs of p and q that work?I am unable to understand please solve the whole question for me "Find the value of P and Q if p-1, q-1 and q+10 are in AP" and send me the answer of picture
Please post a picture of the complete exercise statement (including any separate instructions), so that we can see what you've been given. Thanks!I am unable to understand
Okay thanks!Have you understood that we have told you this doesn't have an answer, because there are many pairs of p and q that work?
Please give us something to work with. What is there that you do understand? Do you know what an arithmetic progression is? Did you leave out part of the problem?
Maybe start here: if q is, say, 10, then what are the last two terms? What does the first term have to be to make this an AP? What is p?
Then pick a different value of q and repeat.
Thankkkksss!!!!!If p-1, q-1 and q+10 are in AP then q+10-(q-1)=q-1-(p-1)
q+10-q+1=q-1-p+1
11=q-p
Thus,d=9
Hence,we need more information to find out such specific solution.
WelcomeThankkkksss!!!!!
Sorry for the typing error. Thanks you are rightd = (q-1) - (p-1) = q - p = 11................OR
d = (q + 10) - (q - 1) = 11