9514 1404 393
Answer:
- no solutions
- a finite number of solutions
- an infinite number of solutions
Step-by-step explanation:
Your question is very general, including linear and non-linear equations of any number and/or degree. In the general case you're asking about, there will be ...
- no solutions -- no values of the variables satisfy all equations
- a finite number of solutions -- all equations are satisfied for some finite set of variable values
- an infinite number of solutions -- equations are dependent (or periodic*) so the set of solutions is an infinite set
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For 2 linear equations in 2 unknowns, there will be 0, 1, or infinite solutions.
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* Aperiodic equations may also have an infinite number of solutions. 1/sin(x)=0 is an example.
Two sides are 34 and 14.
The third side can't be longer than (34 + 14) = 48, because the 34 and the 14
together could not reach from one end of it to the other.
The third side also can't be shorter than 20, because the 20 and the 14 together
could not reach from one end of the 34 to the other.
So 18 doesn't work. (18 + 14) = 32 ... they couldn't cover the 34 .
Answer:
D) SAS
Step-by-step explanation:
Given:
Segment XY = segment VW
Segment XY ║ segment VW
∠ VXY = ∠ WVX (Alternate Interior angle Theorem)
Segment VX ≅ segment VX (relative property of Congruence)
Solution:
In △VWX and △XYV
Segment VX ≅ segment VX
∠ WVX = ∠ VXY
Segment XY = segment VW
∴ By Side Angle Side Congruence Property
△VWX ≅ △XYV by SAS
Answer:
the answer is C or 18x + 18y
If - 1 is a zero then
is a factor.
Dividing with this factor using the long division approach, we get the quadratic factor to be,
(see attachment).
We can rewrite the polynomial as
We can further factor as
That is
