**Strike and dip are measurements that are needed to define the orientation of a plane. The**

**strike line****(1) runs horizontal to the plane. It is measured in degrees or bearing. In quadrant compasses, it is recorded in terms of north. (N72E). Azimuth compasses can read from 0 degrees to 360 degrees. The**

**plunge****(2,3,4) is the direction in which the plane runs (the way it tilts). It is measured in respect to its position from the horizontal. All lines on the plane are plunging,**

**except****the strike line. Lines 2 and 4 are referred to as the**

**apparent dip****, and are always less than the true dip. The**

**true dip****(3) is the line with the steepest inclination. It is expressed in degrees and direction. Note that the dip line and the strike line are 90 degrees from one another.**

**Faults**

**When stress builds up in a rock, it will break. Faults are the product of compressional, tensional or shear stress. There are several types of faults that occur, depending on where and how the stress is placed on the rock.**

**Some common faults:**

**Dip-slip faults**

**Can be formed from either compressional or tensional stress. Normal faults are caused by tensional forces and reverse faults are caused by compressional forces.**

**Strike-slip faults**

**Direction of movement is parallel to the strike. If an observer stands on one side of the fault and sees a person move with the fault on the other side, depending on the direction that person appears to move, will be the classification of the fault**

**Dip-slip normal fault.**

**The fault shown in the above diagram is a**

**normal fault****. The break occurred due to tensional forces. The hanging wall moves down in relation to the footwall. It is considered a "high angle" fault, with an angle usually between 45 and 90 degrees. A fault has a strike, dip and movement. The movement is measured by the**

**heave****(H on diagram), representing the horizontal distance moved and the**

**throw****(T on diagram), which represents the vertical distance moved.**

**Slickenlines****are fine "scratch" lines present on the fault surface that indicates the direction of the slip.**

A fold axis is measured in the field with the following coordinate: (120,20). The strike of the fold axis is N120E and it is dipping 20 degrees SE.

The fold axis is represented on the stereonet by counting (clockwise) 120 degrees east of North. (red "tick mark") The red dot represents the 20 degree dip in the fold axis.

Note: A fold axis is a "line", which is represented on a stereonet as a dot.

Plotting a fold and finding its axis

A fold is measured in the field by obtaining the strike and dip of each of the limbs. The fold represented on the stereonet to the left has one limb orientated at 325 degrees and dips 70 degrees to the NE. The other limb is orientated at 334 degrees and dips 30 degrees west.

The fold axis is a line that represents maximum curvature of the fold and separates the two limbs. On a stereonet, this can be found where the two limbs cross each other. In this case, it would be at: (334,30W).

**Folds**

Sediment is deposited in horizontal layers, called "beds". The oldest sediment is on the bottom and the youngest is on the top (unless the beds are overturned). After deposition, compressional stress applied to a rock will cause it to fold. There are two main types of folds. An

*anticline*is a fold that bends downward, creating a hill-like structure. A*syncline*is a fold that bends upward in the shape of a "U".Anticline Syncline

Folds are considered either

*cylindrical*or*non-cylindrical*. If you were to slice a cylindrical fold (like bread), the sections would appear similar. If you could to take a pencil, without lifting it from the surface of the fold, and bring it from one limb to the other, the fold is cylindrical. Looking at the diagram of the non-cylindrical fold, it is evident that the pencil could not remain on the surface

Cylindrical non-cylindrical

Concept of cylindrical fold

The

*plunge*of a structure is measured as an angle with respect to its position from the horizontal.Folds can be plunging or non-plunging, according to the inclination of its fold axis. (see below diagrams)

Non-pluging Fold Pluging Folds

The above photograph represents a fold that occurs in Unit 2. Strikes and dips were taken on both limbs and the data was plotted on a stereonet in order to determine the orientation of the fold axis.

**Using a Stereographic Net**A stereograph is used by geologists to plot the strike and dip of folds, faults and bed layers uncovered in the field. A

*Wulff Net*stereograph consists of divided areas of equal angle. This will be the type of stereonet used for demonstrations shown here.All longitudinal lines and the equatorial line are considered

*Great Circles.*A plane that intersects the sphere and passes through the center, lies on a Great Circle. All latitude lines (except the equatorial line) are*Small Circles.*A plane that intersects the sphere*without*passing through the center, lies on a Small Circle. Lines are divided into 2 degree intervals, with the darker lines representing 10 degree marks.Preparing the stereonet:

Place a thumb tack through the the center of the stereonet. Next, place a sheet of tracing paper over the net, pushing through the tack. Put a small pencil eraser on top of the tack (to avoid injuries). Trace over the circumference of the net and mark "North" with a tick mark and "N" on the tracing paper.

Plotting a line: ( coordinate: (120,20SE)

1.Count 120 degrees (clockwise) east from North. Put a tick mark on this spot.

2.Turn the tracing paper until this mark aligns with the E-W equatorial Great Circle.

3.From the tick mark, count toward the center 20 degrees. Put a dot on this spot.

Plotting a plane: ( coordinate: (040,45SE)

1.Count 40 degrees (clockwise) east from North. Put a tick mark on this spot.

2.Turn the tracing paper so the "40 degree tick mark" is aligned with North.

3.From the East end of the equatorial line, count in 45 degrees. Mark with a dot.

4.With the dot lined up on one of the longitudinal Great Circles, trace along the Great Circle from top to bottom. Rotate the tracing paper back where both "North's" line up to view the orientation of the plane.

Plotting a fold: ( coordinate: (020,40W) and (325,70NE)

1.

Count 200 degrees (clockwise) from North. Put a tick mark on this spot.

2.Turn the tracing paper so the "200 degree tick mark" is aligned with North.

3.From the East end of the equatorial line, count in 40 degrees. Mark with a dot.

4.With the dot lined up on one of the longitudinal Great Circles, trace along the Great Circle from top to bottom.

Plotting a plane

A bedding plane is measured in the field and the following coordinate is established: (040,45) The strike of the plane is N40E and the plane dips 45 degrees SE. The dip

*direction*is N130E. To represent this plane on a stereonet, count (clockwise) 40 degrees east from North. The red dashed line represents the strike of the plane. The solid red line represents the dip of the plane. All points on this line are the apparent dip, other than the 45 degree mark (which is considered the true dip). The pole to the plane is "normal" to the plane and can be located on the stereonet by counting 90 degrees from the "true dip" mark on the solid red line.

See the above instructions on how to accurately plot these points on a stereonet.

Plotting a fold axis

The fold axis is represented on the stereonet by counting (clockwise) 120 degrees east of North. (red "tick mark") The red dot represents the 20 degree dip in the fold axis.

Note: A fold axis is a "line", which is represented on a stereonet as a dot.

Plotting a fold and finding its axis

A fold is measured in the field by obtaining the strike and dip of each of the limbs. The fold represented on the stereonet to the left has one limb orientated at 325 degrees and dips 70 degrees to the NE. The other limb is orientated at 334 degrees and dips 30 degrees west.

The fold axis is a line that represents maximum curvature of the fold and separates the two limbs. On a stereonet, this can be found where the two limbs cross each other. In this case, it would be at: (334,30W).

....the end....

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