the product of two consecutive odd numbers is 483|Solved: The product of two consecutive positive odd numbers is : Baguio Step by step solution. 01. - Define the Variables. Let the two consecutive odd numbers be represented by the variables: one number is 'x' and the next consecutive odd number will . Bhutan Thimphu Teer Result Today. 847 likes. Gamer
the product of two consecutive odd numbers is 483,Find two consecutive positive odd integers whose product is 483. Solution. 1st number = x. 2nd number= x+2. so: x (x+2) = 483. x² + 2x -483= 0. making the factors of equation we get. x² + 23x - 21x -483= 0. (x-21) (x + 23)= 0. x= 21. x= -23 (-ve value cannot consider) so 1st no= 21. . Detailed Solution. Download Solution PDF. Let; The two consecutive odd integers be P and (P + 2). According to question; P × (P + 2) = 483. ⇒ P 2 + 2P = 483. ⇒ P 2 .
The calculator provides detailed step-by-step solutions, aiding in understanding the underlying concepts. The product of two consecutive positive odd integers is 483. High School Math .Step by step solution. 01. - Define the Variables. Let the two consecutive odd numbers be represented by the variables: one number is 'x' and the next consecutive odd number will . Let the two consecutive odd numbers be 'x+1' and 'x+3'. Given : (x+1) (x+3) = 483. = x^2 + 3x + x + 3 = 483. = x^2 + 4x -480 = 0. =Let's solve your equation step-by-step. .
Answer: The two consecutive positive odd numbers are 21 and 23. Step-by-step explanation: Let 1st number = 2x +1. 2nd number=2x+3. so: (2x +1) (2x+3) = 483. 4x^2 + .
Solved: The product of two consecutive positive odd numbers is The product of two consecutive positive odd numbers is 483. Find the numbers. Provide your answer below:
The product of two consecutive odd number is 483 find the number. See answers. Advertisement. Ankit02. Hiii Ajat , .
To solve the problem of identifying two consecutive odd numbers whose product is 483, we can follow these logical steps: 1. Understand the Problem: We are given three pairs of .
Let's denote the two consecutive odd numbers as $2x - 1$ and $2x + 1$. Step 2/8 According to the problem, the product of these two numbers is 483. So, we can write the equation as .
The product of two consecutive odd number is 483 find the number See answers Advertisement Advertisement Ankit02 Ankit02 Hiii Ajat , _____ Let first no. be x, then another one will be x+2. so, x(x+2) = 483 . x= 21 and x+2 = 23 ans. ANS is 21 and 23 . . Heya!!! Let the two consecutive odd numbers be 'x+1' and 'x+3' Given : (x+1)(x+3) = 483 = x^2 + 3x + x + 3 = 483 = x^2 + 4x -480 = 0 =Let's solve your equation step-by-step. x^2+4x−480=0 Step 1: Use quadratic formula with a=1, b=4, c=-480. x=−b±√b2−4ac2a x=−(4)±√(4)2−4(1)(−480)2(1) x=−4±√19362 x=20 or x=−24 So the possible pairs of .
Step 1/8 Let's denote the two consecutive odd numbers as $2x - 1$ and $2x + 1$. Step 2/8 According to the problem, the product of these two numbers is 483.
The product of two consecutive odd natural numbers is 483. What are the numbers? Algebra. 1 Answer Vinícius Ferraz Jun 11, 2017 #21 times 23# Explanation: #(2n -1)(2n + 1) = 483# #4n^2 - 484 = 0# #n^2 = 121# #n = 11# Answer link. Related questions. How do I determine the molecular shape of a molecule? .
The product of two consecutive odd numbers in 483. Find the numbers. class-10; quadratic-equations; Share It On Facebook Twitter Email. Play Quiz Game > 1 Answer. 0 votes . answered Dec 13, 2019 by Chatur (43.8k points) selected Dec 13, 2019 by Ayush01 . .the product of two consecutive odd integers is 483. find all such pairs of integers. Your solution’s ready to go! Our expert help has broken down your problem into an easy-to-learn solution you can count on.
The two consecutive positive odd numbers are 21 and 23. Step-by-step explanation: Let 1st number = 2x +1 2nd number=2x+3. so: (2x +1)(2x+3) = 483 4x^2 + 6x+2x+3= 483. 4x^2 + 8x+3= 483. 4x^2 + 8x+3-483= 0. 4x^2 + 8x-480= 0. 4(x^2 + 2x-120)= 0. x^2 + 2x-120= 0 /4 . x^2 + 2x-120= 0. x^2 + 12x - 10x -120= 0. x(x + 12) - 10(x +12) = 0 ( x - 10 .
Let the two consecutive positive odd integers be x and (x + 2). According to the given condition, x x + 2 = 483 ⇒ x 2 + 2 x-483 = 0 ⇒ x 2 + 23 x-21 x-483 = 0 ⇒ x x + 23-21 x + 23 = 0 ⇒ x + 23 x-21 = 0 ⇒ x + 23 = 0 or x-21 = 0 ⇒ x =-23 or x = 21 ∴ x = 21 (x is a positive odd integer) When x = 21, x + 2 = 21 + 2 = 23 Hence, the .Question 383784: the product of two consecutive odd integers is 483. find the integers Answer by Alan3354(69429) ( Show Source ): You can put this solution on YOUR website!
21 and 23 >let n be an odd integer. Then the next consecutive odd number will be n + 2. Odd integers are separated by 2 ( 1 , 3 , 5 ,7 , 9...) The product of n and n+ 2 = n(n + 2 ) =483 (distribute the brackets ) hence : n^2 + 2n -483 = 0 To factor require 2 numbers that multiply to give - 483 and sum to give +2.
Question 796263: Two consecutive odd whole numbers have a product of 483. What is the smaller of the two numbers? Answer by Alan3354(69429) (Show Source):the product of two consecutive odd numbers is 483 Solved: The product of two consecutive positive odd numbers is Free Product of Consecutive Numbers Calculator - Finds the product of (n) consecutive integers, even or odd as well. Examples include: product of 2 consecutive integersthe product of two consecutive odd numbers is 483You can put this solution on YOUR website! First number is X, consecutive odd number is X+2 X+X+2=44 2X+2=44 2X=42 X=21 First number is 21 X+2=23 Consecutive odd number is 23 Product=21(23)=483 Often you are given the value of the product of two consecutive numbers. You need to find out the value of each number. . Example: If the product of two consecutive odd numbers is 483. find the numbers. Let the two consecutive odd numbers be \(x\) and \(x + 2\). \(\therefore{(x)}{(x + 2)}=483\) \(2x+x^2=483\)The product of two positive consecutive odd integers is 483.Find the integers - 3221959. answered The product of two positive consecutive odd integers is 483.Find the integers . The product of the 2 numbers next to each other in a row is incircle above the 2 numbers. T . he first one has been done for you.24010223002436Number of Correct .
Find step-by-step Algebra solutions and your answer to the following textbook question: The product of two consecutive negative odd integers is 483. Find the integers..For any two consecutive odd numbers, the difference is also 2. For example, 16 and 18 are two consecutive even numbers, their difference $= 18 \;–\; 16 = 2$. If “n” is an odd number, then the sum of “n” consecutive numbers will be divisible by “n.”Let one of the odd positive number be x. The other odd positive number will be (x + 2) The product of the numbers is x ( x + 2 ) = 195 ∴ x 2 + 2 x − 195 = 0
the product of two consecutive odd numbers is 483|Solved: The product of two consecutive positive odd numbers is
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