![yabfegi9669](/avatars/3533.jpg)
yabfegi9669
02.11.2020 •
Mathematics
For what values of K, the pair of linear equation 3x+y=3 and 6x+ky=8 has a unique solution
Solved
Show answers
More tips
- H Health and Medicine Impeccable Memory: How to Improve It...
- L Leisure and Entertainment How Many Seasons are There in the TV Show Interns?...
- S Sport When will the Biathlon World Championships 2011 take place in Khanty-Mansiysk? Answers to frequently asked questions...
- H Health and Medicine Trading Semen for Money: Where Can You Sell and Why Would You Want to?...
- F Food and Cooking Homemade French Fries: The Ultimate Guide...
- H Health and Medicine How to Increase Blood Pressure without Medication?...
- S Style and Beauty Choosing a Hair Straightener: Specific Criteria to Consider...
- F Food and Cooking How to Make Polendwitsa at Home?...
- S Science and Technology When do we change our clocks?...
- L Leisure and Entertainment What to Give a Girl on March 8?...
Answers on questions: Mathematics
- M Mathematics Consider right triangle JKL below. Which expressions are equivalent to sin (angleK)? can someone plss help me...
- M Mathematics 7% of 321 . answer i beg you...
- M Mathematics Write a polynomial with the zeros equaling to -1,1,8...
- S Social Studies in the context of determinants of civil society, involves the voluntary acceptance of standards established by nongovernmental entities....
- B Biology A cooperative effect can occur in some types of multi-subunit proteins, leading to improved function of the subunits when bound to each other. At what level of protein...
- M Mathematics Describe the error made when converting the equation to vertex form....
Ответ:
k = 2, k ≠ 8/3
Step-by-step explanation: To Find:
The value of k so the pair of equations does not have a solution
Solution:
Here we are given a pair of linear equations.
We have to find the value of k so that the equations do not have a solution.
The equations are:
3x + y = 3
6x + ky = 8
where a₁ = 3, a₂ = 6, b₁ = 1, b₂ = k, c₁ = 3, c₂ = 8
Ответ:
The domain of a function is all the possible input or x values.
In this problem, we can see the function starts at (0, 0) tapering off to the right infinitely. This means that every positive x value including 0 is in the domain.
0, 1, 2, 5 are all in the domain.