Visual Arts Blog : 2015

Monday 25 May 2015

1st ESO PROJECTS

The 1st ESO students work in groups each week to present a project. They develop a creative and original idea and they show to their mates how to do it.

This last week Elsa and Nora did a great job with this video where they show how to make a finish star. I hope you will enjoy it!

Wednesday 13 May 2015

Triangles

Definition

A triangle is a closed figure consisting of three line segments linked end-to-end. A triangle has three sides and three angles.

Triangle properties

Vertex	The vertex (plural: vertices) is a corner of the triangle. Every triangle has three vertices.
Base	The base of a triangle can be any one of the three sides, usually the one drawn at the bottom.
Perimeter	The distance around the triangle. The sum of its sides.
Interior angles	The three angles on the inside of the triangle at each vertex.
Exterior angles	The angle between a side of a triangle and the extension of an adjacent side.
Altitude or height	The altitude of a triangle is the perpendicular from one side to the opposite vertex. The three altitudes intersect at a single point, called the orthocenter of the triangle.
Median	The median of a triangle is a line from a vertex to the midpoint of the opposite side.Thethree medians intersect at a single point, called the centroid of the triangle.

Circumcenter	The circumcenter (circuncentro) is the point of intersection of the three perpendicular bisectors of the sides. The circumcenter is also the center of the triangle's circumcircle (circunferencia circunscrita) - the circumference that passes through all three of the triangle's vertex.
Incenter	The point of intersection of the three angles bisector is the incenter (Incentro). The incenter is also the center of the triangle's incircle (circunferencia inscrita)- the largest circle that will fit inside the triangle.

Also:

The shortest side is always opposite the smallest interior angle
The longest side is always opposite the largest interior angle

Properties of all triangles

The interior angles of a triangle always add up to 180°
The exterior angles of a triangle always add up to 360°

Terminology

It is usual to name each vertex of a triangle with a single capital (upper-case) letter. The sides can be named with a single small (lower case) letter, and named after the opposite angle.

Classification of triangles

From: http://www.mathopenref.com/triangle.html

Monday 20 April 2015

VISUAL ELEMENTS OF ART

The elements of art are shape, form, value, line, color, space and texture. This last term we will work combining the different visual elements of art, starting with a SELF PORTRAIT.

Dots, lines and planes from Noelia Calle

Check these presentations to get a better idea:

The Visual Elements from Gary Freeman

ACTIVITY: SELF PORTRAIT

Assessment Criteria (do not forget to copy this at the back of your work)

1.Draw a margin or a frame or a background (1 point)

2. Use the line to create the impression of volume (implied volume) (3 points)

3. Originality, creativity (1 point)

4. Expressiveness (2 points)

4. Neatness, good presentation (1 points)

5. Description of your work, minimum 5 sentences (1 point)

6. Self evaluation (1 point)

EXAMPLE OF A IMPLIED VOLUME WITH LINES

Friday 17 April 2015

What can you see?

This is our next activity, some of you have already experimented with it, and here are some examples:

Assessment Criteria (do not forget to copy this at the back of your work)

1.Draw a margin or a frame or a background. (1 point)

2. Use primary colours. (2 points)

3. Originality, creativity. (3 points)

4. Neatness, good presentation. (2 points)

5. Description of your work (1 point) including:

Technique of your artwork
Objective of the artwork

6. Selfevaluation. (1 point)

Monday 6 April 2015

GEOMETRY REVIEW FOR 3rd ESO STUDENTS

Point (punto)

− A point is the place where two lines intersect.

− In geometry, a point has no dimension

− We represent a point with a dot.

− We identify this point with a CAPITAL letter.

Line (línea)

− A line is made up of infinite points.

− It has not endpoints and continues endlessly on a plane.

− These lines are named with small letters such r ,s, t...

Ray (semirrecta)

− A ray is a "straight" line that begins at a certain point and extends forever in one direction.

− The point where the ray begins is known as its endpoint.

Line segment (segmento)

− A line segment is a portion of a "straight" line.

− A line segment does not extend forever, but has two endpoints.

− The point halfway between the endpoints of a line segment is called the midpoint. A midpoint divides a line segment into two equal segments.

Intersection

− The term intersect is used when lines, ray lines or segments share a common point.

− The point they share is called the point of intersection.

2. Operations with Line Segments

2.1. Adding and subtracting line segments

a) Adding

The addition of two segments is another segment that begins at the origin of the first segment and ends at the end of the second segment.
The length of the new segment is the addition of the measures of those two segments.

b) Subtrating

The subtration of two segments is another segment that takes as the origin, the end of the smaller segment and as the end, the end of the biggest segment.
The length of the segment difference is equal to the subtraction of the lengths of two segments.

2.2. Perpendicular Bisector

The perpendicular bisector is a perpendicular line that passes through the midpoint of the segment, so it divides the segment in two equal parts.
All the points which belong to the perpendicular bisector are at the same distance from the endpoints of the segment.

To draw a line bisector we use the compass and the rulers. Let's check how to draw it with this video:

2.3. How to divide a line segment into equal parts (Thales theorem)

1. Draw a ray that shares the origin of point A with the line segment segment AB.

2. Mark in the ray as many equal units as you want to obtain starting from point A. In this case, we are goint to divide the segment into three equal parts.

3. Join the point B with the end of the ray. For each of the divisions of the ray, draw parallel lines to the segment joining B. The points obtained in the segment AB represent 3 equal parts.