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An equation must have 1, 0, or infinitely many solutions. So if you find 1 and there is another, you have know it has infinitely many. For example. 0x+2=2 I solve this and the equations become 0x=0 Now, 1 is a solutions, but so is 2. I now know there are infinitely many. How about 0x+2=3. No solution and 2x+2=4, has one solution. I put those two here so you might try other numbers and see that they have no solutions and one solution. A special type of equation known as an identity is an equation that holds for all numbers. This means it has infinitely many solutions.
Let x = ounces of 50% solution, and y = ounces of 1% solution. So that we have: 0.5x + 0.01y = 8(0.2) which is a linear equation in two variables, meaning there are infinitely many choices of mixing those solutions.
It is a surface with zero curvature. It is 2-dimensional and in those two dimensions it extends infinitely far.It is a surface with zero curvature. It is 2-dimensional and in those two dimensions it extends infinitely far.It is a surface with zero curvature. It is 2-dimensional and in those two dimensions it extends infinitely far.It is a surface with zero curvature. It is 2-dimensional and in those two dimensions it extends infinitely far.
There is no "the" answer. y = X + 3 is the equation of a line. There are infinitely many points on the line and the coordinates of each one of those points is a solution (or answer) to y = X + 3.
It is impossible. Given any set of n numbers, it is easy to find infinitely many polynomials of order n that can be used as a rule for those numbers. In addition, there are non-polynomial solutions. Short of reading the mind of the person who posed the question, there is no way of determining which of the infinitely many solutions is the "correct" one. The best that you can do is Occam's test: go for the simplest solution. For example, what is the rule for the sequence 10, 20, 30, 40, 50? Is it t(n) = 10*n? Why not t(n) = (n^5 - 15*n^4 + 85*n^3 - 225*n^2 + 334*n - 120)/6 ? For n = 1 , 2, 3, 4, 5 they give the same result: the sequence for which you are seeking a rule. Mathematically, both answers are equally valid.
An equation must have 1, 0, or infinitely many solutions. So if you find 1 and there is another, you have know it has infinitely many. For example. 0x+2=2 I solve this and the equations become 0x=0 Now, 1 is a solutions, but so is 2. I now know there are infinitely many. How about 0x+2=3. No solution and 2x+2=4, has one solution. I put those two here so you might try other numbers and see that they have no solutions and one solution. A special type of equation known as an identity is an equation that holds for all numbers. This means it has infinitely many solutions.
is0tonic solutions are those solutions that have the same concentration with the body fluid.
Let x = ounces of 50% solution, and y = ounces of 1% solution. So that we have: 0.5x + 0.01y = 8(0.2) which is a linear equation in two variables, meaning there are infinitely many choices of mixing those solutions.
the solutions for the world hunger cause are to give food to all the starved, poor, and not wealthy people food, and a shelther, those are the solutions:)
Glucose does not dissociate into charged ions in water solution, and the only water solutions with high conductivity are those with substantial concentrations of charged ions, such as the solutions of most salts, acids, and bases.
By dissolving the pH solution a colour change will occur in the solution that should be tested.Compairing the colour of solution to the colours marked on of pH chart we can find out if the solution we tested is of alkaline nature or of acidic nature or neutral.Solutions of pH7are neutral solutions.Solutions below pH7 are acidic solutions and those above pH7 are alkaline solutions.
When a solution has accepted as much solute as is possible at a given temperature, the solution is said to be saturated. Under certain conditions, saturated solutions can be concentrated to give supersaturated solutions. Supersaturated solutions are those which possess more of a solute than normally dissolves in a solvent at a given temperature.
Colloids contain particles that are larger than those in a solution but smaller than those in a suspension. Suspensions have particles that are large enough to settle out over time, unlike solutions where particles are uniformly dispersed and do not settle. Solutions have the smallest particle size and the particles do not settle or scatter light.
When comparing solutions, those that have the same concentration are isotonic. One that is more concentrated is hypertonic; less concentrated is hypotonic.
Some examples of solid liquid solutions include sugar dissolved in water, salt dissolved in water, and alcohol dissolved in water. In each case, the solid particles (sugar, salt, or alcohol) are evenly distributed in the liquid solvent (water) to form a clear solution.
No, not all mixtures are solutions. A solution is a homogenous mixture where the substances are evenly distributed, but mixtures can be either homogenous or heterogenous. Heterogenous mixtures have uneven distribution of substances and do not form a clear solution.
To arrive at a workable solution to a problem, it is important to follow a structured approach. This can include defining the problem clearly, gathering relevant information, generating possible solutions, evaluating those solutions, and then implementing and monitoring the chosen solution. It is also beneficial to involve stakeholders, consider potential risks, and be open to revising the solution if needed.