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A translation of 4 units to the right followed by a dilation of a factor of 2
These are called the second differences. If they are all the same (non-zero) then the original sequence is a quadratic.
It is the sequence of first differences. If these are all the same (but not 0), then the original sequence is a linear arithmetic sequence. That is, a sequence whose nth term is of the form t(n) = an + b
The sequence represents a non-convergence sequence. The sequences carries out -27, 17, 19, -21, 44, 2, -40,-42,-42. This is a math sequencing solution that gives a pattern to the original numbers given.
A geometric sequence is a sequence where each term is a constant multiple of the preceding term. This constant multiplying factor is called the common ratio and may have any real value. If the common ratio is greater than 0 but less than 1 then this produces a descending geometric sequence. EXAMPLE : Consider the sequence : 12, 6, 3, 1.5, 0.75, 0.375,...... Each term is half the preceding term. The common ratio is therefore ½ The sequence can be written 12, 12(½), 12(½)2, 12(½)3, 12(½)4, 12(½)5,.....
A translation of 4 units to the right followed by a dilation of a factor of 2
The transformation process is an 'enlargement'
To show congruency between two shapes, you can use a sequence of rigid transformations such as translations, reflections, rotations, or combinations of these transformations. By mapping one shape onto the other through these transformations, you can demonstrate that the corresponding sides and angles of the two shapes are congruent.
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Given two sets of angles and the included side congruent, we seek a sequence of rigid motions that will map Δ_____onto Δ___ proving the triangles congruent.
first they say their planet name then they say after their planet name:planet power,make up!Example:http://wiki.answers.com/index.php?title=Uranus_Planet_Power,_Make_Up(sailor uranus transformation sequence)
The identity transformation.
Light energy is transformed into chemical energy
A backmutation is a mutation in genetics which restores the original sequence and the original phenotype.
It means that more than one transformation is used.
These are called the second differences. If they are all the same (non-zero) then the original sequence is a quadratic.
It is the sequence of first differences. If these are all the same (but not 0), then the original sequence is a linear arithmetic sequence. That is, a sequence whose nth term is of the form t(n) = an + b