What two consecutive integers have a product of 168?
Let the two consecutive even integers be (2x) , (2x+2). i.e -14 , -12. i.e 12 and 14.
How do you solve the product of two consecutive even integers is 168?
- x2+2x−168=0(x+14)(x−12)=0[Factoring the trinomial]
- x(x+2)=168−14(−12)=168[Substitution of values]168=168.
- x(x+2)=16812(14)=168[Substitution of values]168=168.
What is the integer of 168?
168 (one hundred [and] sixty-eight) is the natural number following 167 and preceding 169….168 (number)
← 167 168 169 → | |
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Ordinal | 168th (one hundred sixty-eighth) |
Factorization | 23 × 3 × 7 |
Divisors | 1, 2, 3, 4, 6, 7, 8, 12, 14, 21, 24, 28, 42, 56, 84, 168 |
Greek numeral | ΡΞΗ´ |
What is the product of 168?
Negative Factors of 168: -1, -2, -3, -4, -6, -7, -8, -12, -14, -21, -24, -28, -42, -56, -84, and -168….Factors of 168 in Pairs.
Product form of 168 | Pair factor |
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21 × 8 = 168 | (21, 8) |
What are the two consecutive even integers whose product is 624?
(x+26)(x-24)=0 x=-26 or x=24 We want the positive solution so x=24 and x+2=26 24*26=624 so it works.
Is 167 an integer number?
167 (one hundred [and] sixty-seven) is the natural number following 166 and preceding 168….167 (number)
← 166 167 168 → | |
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← 160 161 162 163 164 165 166 167 168 169 → List of numbers — Integers ← 0 100 200 300 400 500 600 700 800 900 → | |
Cardinal | one hundred sixty-seven |
What is the two consecutive integers?
In a set of consecutive integers (or in numbers), the mean and median are equal. If x is an integer, then x + 1 and x + 2 are two consecutive integers.
What is the product of 2 consecutive numbers?
Given two consecutive numbers, one must be even and one must be odd. Since the product of an even number and an odd number is always even, the product of two consecutive numbers (and, in fact, of any number of consecutive numbers) is always even.
What is 168 as a product of primes?
Let us express 168 in terms of the product of its prime factors as 2 × 2 × 2 × 3 × 7.
Is 168 a square number?
The square root of 168 is expressed as √168 in the radical form and as (168)½ or (168)0.5 in the exponent form….Square Root of 168.
1. | What is the Square Root of 168? |
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3. | Is the Square Root of 168 Irrational? |
4. | FAQs |
What is the two consecutive even integers whose product is 48?
The numbers are 6 and 8.