![AestheticRoses](/avatars/1422.jpg)
AestheticRoses
12.01.2021 •
Mathematics
How can you rewrite the following equation so that it will have infinitely many
solutions?
6x - 3=53 - 5
O Change the coefficient of x to be the same number.
O Multiply one side of the equation.
O Change the constants to be the same.
O Both A and C need to occur to create infinitely many solutions.
Solved
Show answers
More tips
- F Food and Cooking Effective Methods to Organize Videos in your iPad According to Content...
- F Family and Home Parquet or laminate, which is better?...
- L Leisure and Entertainment How to Properly Wind Fishing Line onto a Reel?...
- L Leisure and Entertainment How to Make a Paper Boat in Simple Steps...
- T Travel and tourism Maldives Adventures: What is the Best Season to Visit the Luxurious Beaches?...
- H Health and Medicine Kinesiology: What is it and How Does it Work?...
- O Other How to Choose the Best Answer to Your Question on The Grand Question ?...
- L Leisure and Entertainment History of International Women s Day: When Did the Celebration of March 8th Begin?...
- S Style and Beauty Intimate Haircut: The Reasons, Popularity, and Risks...
- A Art and Culture When Will Eurovision 2011 Take Place?...
Answers on questions: Mathematics
- M Mathematics Anyone I need help ASAP please please help...
- M Mathematics What is the fraction for 4.5...
- M Mathematics Please graph this and post photo for the answer. I m giving good points...
- C Chemistry What element makes protein different from carbohydrate and fat?...
- E English Everyone you trust just stab you in the back. it better to only trust that one specific person...
- M Mathematics Solve the formula for $b_2$ .Area of a trapezoid: $A=\frac{1}{2}h\left(b_1+b_2\right)_{ }$$b_2=$...
Ответ:
Parallel lines
Step-by-step explanation:
Line BC:
Line AD:
Adding both equations, in this case, gives us the point at which the lines intersect:
Since zero will never equal fourteen, the equation above means that lines BC and AD will never intersect. When two lines have no point in common, they are said to be parallel lines.