Matthew Thomas Pakes (nicknamed Pakesy), is a student at Glamorgan University in Wales.
Early Life
Matthew was born on the 31st of January 1989. He was born at St Mary's Hospital on the Isle of Wight. He attended various schools across the Island until finishing school at Medina High School, Newport.
Matthew received three A-levels in Physics, Maths and English Literature and Language.
Matthew is now attending Glamorgan University in Wales. He is studying Aerospace Engineering and is staying on campus in Pontypridd.
Gipsy Moth
Matthew was a crew member on the Gipsy Moth IV from the 25th of September to the 10th of October. He boarded the vessel in Plymouth and left in Gibraltar. Just before the voyage Matthew was said to be "in awe of The Bay of Biscay, but i'm looking forward to overcoming any challenges that come my way during the voyage.". During the voyage Matthew featured in many video clips often showing signs of seasickness, most notably on the 29th of September in a clip named [http://www.gipsymoth.org/gmtv.asp# "Matt's Diary"].
Sporting Life
Matthew is also an active member of . Being a young wicketkeeper for the first XI. In the 2006 cricket season he played 29 times, batting 25 of those and scoring an average of 4.27 runs. Matthew holds the Wootton CC record for the highest number of "ducks" in a season (9). He also averaged 0.6 catches, 0.3 stumpings and 0.4 run-outs per game as wicketkeeper. While his wicketkeeping technique is known to be slightly unorthodox, it has also proved to be successful, as proven by the relatively high rate of dismissals for a wicketkeeper at this level of cricket.
Matthew was awarded indoor cricketer of the year for the 2005/06 season . Following this he was elected indoor, and weekend (outdoor) vice captain for the second year running. Under his vice-captaincy, Wootton performed well coming a respectable 3rd place in the league and 2nd in the cup..
Early Life
Matthew was born on the 31st of January 1989. He was born at St Mary's Hospital on the Isle of Wight. He attended various schools across the Island until finishing school at Medina High School, Newport.
Matthew received three A-levels in Physics, Maths and English Literature and Language.
Matthew is now attending Glamorgan University in Wales. He is studying Aerospace Engineering and is staying on campus in Pontypridd.
Gipsy Moth
Matthew was a crew member on the Gipsy Moth IV from the 25th of September to the 10th of October. He boarded the vessel in Plymouth and left in Gibraltar. Just before the voyage Matthew was said to be "in awe of The Bay of Biscay, but i'm looking forward to overcoming any challenges that come my way during the voyage.". During the voyage Matthew featured in many video clips often showing signs of seasickness, most notably on the 29th of September in a clip named [http://www.gipsymoth.org/gmtv.asp# "Matt's Diary"].
Sporting Life
Matthew is also an active member of . Being a young wicketkeeper for the first XI. In the 2006 cricket season he played 29 times, batting 25 of those and scoring an average of 4.27 runs. Matthew holds the Wootton CC record for the highest number of "ducks" in a season (9). He also averaged 0.6 catches, 0.3 stumpings and 0.4 run-outs per game as wicketkeeper. While his wicketkeeping technique is known to be slightly unorthodox, it has also proved to be successful, as proven by the relatively high rate of dismissals for a wicketkeeper at this level of cricket.
Matthew was awarded indoor cricketer of the year for the 2005/06 season . Following this he was elected indoor, and weekend (outdoor) vice captain for the second year running. Under his vice-captaincy, Wootton performed well coming a respectable 3rd place in the league and 2nd in the cup..
Burglish is the one of the written style of Burmese(Myanmar) in English.
like "myan mar" for ျမန္မာ
Burmese + English = Burglish.
Some People call it for Myanglish (Myanmar + English).
Burglish a romanization of Burmese (Myanmar) language also.
And this entry Burmese English is mean Burglish in some cases.
remark: I dont know why some ppl dont want the things for Burmese. carry on. delete it.
like "myan mar" for ျမန္မာ
Burmese + English = Burglish.
Some People call it for Myanglish (Myanmar + English).
Burglish a romanization of Burmese (Myanmar) language also.
And this entry Burmese English is mean Burglish in some cases.
remark: I dont know why some ppl dont want the things for Burmese. carry on. delete it.
ladslads.com is an independent British gay communinty website. It claims to be "the most advanced gay communinty in the UK", and has more than 200,000 million unique accounts registered in its first year. The firm was launched in Jan 2006, and is based in Newport.
LadsLads is a regsitered trademark, registered to PanRemmus Corporation, Delware.
LadsLads is a regsitered trademark, registered to PanRemmus Corporation, Delware.
Types of triangles:
Triangles can be classified according to the relative lengths of their sides:
• In an equilateral triangle, all sides are of equal length. An equilateral triangle is also an equiangular polygon, i.e. all its internal angles are equal—namely, 60°; it is a regular polygon
• In an isosceles triangle, two sides are of equal length. An isosceles triangle also has two congruent angles (namely, the angles opposite the congruent sides). An equilateral triangle is an isosceles triangle, but not all isosceles triangles are equilateral triangles.
• In a scalene triangle, all sides have different lengths. The internal angles in a scalene triangle are all different.
Triangles can also be classified according to the their internal angles, described below using degrees of arc.
• A right triangle (or right-angled triangle, has one 90° internal angle (a right angle). The side opposite to the right angle is the hypotenuse; it is the longest side in the right triangle. The other two sides are the legs or catheti (singular: cathetus) of the triangle.
• An obtuse triangle has one internal angle larger than 90° (an obtuse angle).
• An acute triangle has internal angles that are all smaller than 90° (three acute angles). An equilateral triangle is an acute triangle, but not all acute triangles are equilateral triangles.
• An oblique triangle has only angles that are smaller or larger than 90°. It is therefore any triangle that is not a right triangle.
Congruent and Similar Triangles:
Rules in Geometry to tests for congruent triangles:
a. SAS Test – Side-Angle-Side
b. SSS Test - Side-Side-Side
c. ASA Test - Angle-Side-Angle d. AAS Test - Angle-Angle-Side
a.) Side-Angle-Side
The rule states that if two sides and the included angle are congruent to two sides and the included angle of a second triangle, the two triangles are congruent. An included angle is an angle created by two sides of a triangle.
b.) Side-Side-Side
The rule states that if three sides of one triangle are congruent to three sides of a second triangle, the two triangles are congruent.
c.) Angle-Side-Angle
The rule states that if two angles and the included side of one triangle are congruent to two angles and the included side of another triangle, the triangles are congruent. An included side is a side that is common to (between) two angles. For example, in the figure used in the problem below, segment AB is an included side to angles A and B.
d.) Angle-Angle-Side
The rule states that if two angles and a nonincluded side of one triangle are congruent to two angles and the corresponding nonincluded side of another triangle, the two triangles are congruent.
CPCTC
When two triangles are congruent, all six pairs of corresponding parts (angles and sides) are congruent. This statement is usually simplified as corresponding parts of congruent triangles are congruent, or CPCTC for short.
Triangles can be classified according to the relative lengths of their sides:
• In an equilateral triangle, all sides are of equal length. An equilateral triangle is also an equiangular polygon, i.e. all its internal angles are equal—namely, 60°; it is a regular polygon
• In an isosceles triangle, two sides are of equal length. An isosceles triangle also has two congruent angles (namely, the angles opposite the congruent sides). An equilateral triangle is an isosceles triangle, but not all isosceles triangles are equilateral triangles.
• In a scalene triangle, all sides have different lengths. The internal angles in a scalene triangle are all different.
Triangles can also be classified according to the their internal angles, described below using degrees of arc.
• A right triangle (or right-angled triangle, has one 90° internal angle (a right angle). The side opposite to the right angle is the hypotenuse; it is the longest side in the right triangle. The other two sides are the legs or catheti (singular: cathetus) of the triangle.
• An obtuse triangle has one internal angle larger than 90° (an obtuse angle).
• An acute triangle has internal angles that are all smaller than 90° (three acute angles). An equilateral triangle is an acute triangle, but not all acute triangles are equilateral triangles.
• An oblique triangle has only angles that are smaller or larger than 90°. It is therefore any triangle that is not a right triangle.
Congruent and Similar Triangles:
Rules in Geometry to tests for congruent triangles:
a. SAS Test – Side-Angle-Side
b. SSS Test - Side-Side-Side
c. ASA Test - Angle-Side-Angle d. AAS Test - Angle-Angle-Side
a.) Side-Angle-Side
The rule states that if two sides and the included angle are congruent to two sides and the included angle of a second triangle, the two triangles are congruent. An included angle is an angle created by two sides of a triangle.
b.) Side-Side-Side
The rule states that if three sides of one triangle are congruent to three sides of a second triangle, the two triangles are congruent.
c.) Angle-Side-Angle
The rule states that if two angles and the included side of one triangle are congruent to two angles and the included side of another triangle, the triangles are congruent. An included side is a side that is common to (between) two angles. For example, in the figure used in the problem below, segment AB is an included side to angles A and B.
d.) Angle-Angle-Side
The rule states that if two angles and a nonincluded side of one triangle are congruent to two angles and the corresponding nonincluded side of another triangle, the two triangles are congruent.
CPCTC
When two triangles are congruent, all six pairs of corresponding parts (angles and sides) are congruent. This statement is usually simplified as corresponding parts of congruent triangles are congruent, or CPCTC for short.