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# Triangle Calculator to Solve SSS, SAS, SSA, ASA, and AAS Triangles

Calculator Preferences Triangle Calculator

This triangle solver will solve SSS, SAS, SSA, ASA, and AAS Triangles. Angle values can be entered in degrees or radians. The calculator will also classify the triangle and solve and provide formulas for: area, perimeter, semi-perimeter, radius of inscribed circle, radius of circumscribed circle, medians, and heights. Plus, the calculator shows its work and attempts to draw the solved triangle from calculated vertex coordinates.

#### Selected Data Record:

A Data Record is a set of calculator entries that are stored in your web browser's Local Storage. If a Data Record is currently selected in the "Data" tab, this line will list the name you gave to that data record. If no data record is selected, or you have no entries stored for this calculator, the line will display "None".

DataData recordData recordSelected data record: None
Dec places:Decimal places:Number of decimal places:Number of decimal places to round result to:

#### Number of decimal places:

Select how many decimal places you would like the result rounded to. Note that you can change the number of places before or after solving the triangle.

Angles in:Angles stated in:Angles stated in:Angles stated in:

#### Angles stated in:

Select whether you will be entering angle values as degrees or radians.

Known values:

#### Known values:

Select the radio button that indicates which three of the triangle values are known. Upon making your selection the triangle calculator will load the appropriate entry form.

SSS - 3 side lengths

SAS - 2 sides and the included angle given

SSA - 2 sides and non-included angle given

ASA - a side and 2 adjacent angles

AAS - a side, 1 adjacent angle, and the opposite angle

 SSS: Enter the 3 Sides Side a:Side aSide a length:Side a length:

#### Side a length:

Enter the length of side a.

 Side length a
Side b:Side bSide b length:Side b length:

#### Side b length:

Enter the length of side b.

 Side length b
Side c:Side cSide c length:Side c length:

#### Side c length:

Enter the length of side c.

 Side length c
TriangleSolution
TypeTypeClassificationClassification

#### Triangle classification:

This is the type of triangle based on the entered and computed triangle values.

Side aSide aSide aSide a

#### Side a:

This is the length of side a of the solved triangle.

Side bSide bSide bSide b

#### Side b:

This is the length of side b of the solved triangle.

Side cSide cSide cSide c

#### Side c:

This is the length of side c of the solved triangle.

Angle AAngle AAngle AAngle A

#### Angle A:

This is the angle of vertex A of the solved triangle.

Angle BAngle BAngle BAngle B

#### Angle B:

This is the angle of vertex B of the solved triangle.

Angle CAngle CAngle CAngle C

#### Angle C:

This is the angle of vertex C of the solved triangle.

PPPerimeterPerimeter

#### Perimeter:

This is the perimeter (P) of the solved triangle. The formula used is P = a + b + c.

ssSemi-perimeterSemi-perimeter

#### Semi-perimeter:

This is the semi-perimeter (s) of the solved triangle. The formula used is s = (a + b + c) / 2.

AreaAreaAreaArea

#### Area:

This is the area (K) of the solved triangle. The formula used is K = (base x height) / 2.

This is the radius (r) of the inscribed circle of the solved triangle. The inscribed circle is the largest circle that will fit within the triangle. The formula used to find the radius is, r = sqrt[ ((s-a)(s-b)(s-c)) / s], where s is the semi-perimeter of the triangle.

This is the radius (R) of the circumscribed circle of the solved triangle. The circumscribed circle is a circle that passes through all three vertices of a triangle. The formula used to find the radius is, R = (abc) / (4K), where K is the area of the triangle.

mamaMedian maMedian ma

#### Median ma:

This is the length of the median (ma), which is the line that runs from vertex A to the mid-point of side a (the opposite side). The formula used for finding the length of the line is, ma = (1/2)sqrt[2c2 + 2b2 - a2].

mbmbMedian mbMedian mb

#### Median mb:

This is the length of the median (mb), which is the line that runs from vertex B to the mid-point of side b (the opposite side). The formula used for finding the length of the line is, mb = (1/2)sqrt[2c2 + 2a2 - b2].

mcmcMedian mcMedian mc

#### Median mc:

This is the length of the median (mc), which is the line that runs from vertex C to the mid-point of side c (the opposite side). The formula used for finding the length of the line is, mc = (1/2)sqrt[2a2 + 2b2 - c2].

hahaHeight haHeight ha

#### Height ha:

This is the height (h) of the triangle using side a as the base. The formula used to find the height is, ha = 2 * (K / a), where K is the area of the triangle.

hbhbHeight hbHeight hb

#### Height hb:

This is the height (h) of the triangle using side b as the base. The formula used to find the height is, hb = 2 * (K / b), where K is the area of the triangle.

hchcHeight hcHeight hc

#### Height hc:

This is the height (h) of the triangle using side c as the base. The formula used to find the height is, hc = 2 * (K / c), where K is the area of the triangle.

A coordA coordA coordVertex A coordinate

#### Vertex A coordinate:

This is the coordinate used for vertex A. In order to plot the triangle for drawing, vertex A is always located at coordinate [0,0].

B coordB coordB coordVertex B coordinate

#### Vertex B coordinate:

This is the coordinate used for vertex B. In order to plot the triangle for drawing, the y coordinate of vertex B is always 0. The x coordinate of vertex B is always equal to the length of side c.

C coordC coordC coordVertex C coordinate

#### Vertex C coordinate:

This is the coordinate used for vertex C. The calculations used to find the x and y coordinates of vertex C are as follows:
ca = (b2 - a2 + c2) / (2 * c)
ch = sqrt[b2 - ca2]
cx2 = 0 + (ca * (c - 0)) / c
Cx = cx2 + (ch * ( 0 - 0 ) / c)
cy2 = 0 + (ca * (0 - 0)) / c
Cy = cy2 + (ch * ( c - 0 ) / c)

CentroidCentroidCentroid coord.Centroid coordinate

#### Centroid coordinate:

This is the centroid coordinate based on the three vertex coordinates. The formula used is:
Centroid x = 1/3(Ax + Bx + Cx)
Centroid y = 1/3(Ay + By + Cy)

CC coordCC coordCircumcenter coord.Circumcenter coordinate

#### Circumcenter coordinate:

This is the circumcenter coordinate based on the three vertex coordinates. The formula used is:
D = 2(BxCy - ByCx)
Ux = Cy(Bx2 + By2) - By(Cx2 + Cy2) / D
Uy = Bx(Cx2 + Cy2) - Cx(Bx2 + By2) / D

I will show my work here:

If you would like to save the current entries to the secure database, tap or click on the Data tab, select "New Data Record", give the data record a name, then tap or click the Save button. To save changes to previously saved entries, simply tap the Save button. Please select and "Clear" any data records you no longer need.

Feedback AppreciatedFeedback Greatly AppreciatedYour Feedback Would Be Greatly AppreciatedYour Feedback Is Greatly Appreciated

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 iPhone Android   Help and Tools

#### Help and Tools:

This section, which you can Unstick or Hide in the Calculator Preferences (just above the top of the calculator), contains the following tabs (content too long to fit within bordered frame can be scrolled up and down):

About: Click this tab for an introduction to the calculator.

Instructions: Click this tab for step-by-step instructions for using the calculator.

Terms: Click this tab for a list of the descriptions that are located within each popup help button (info icons).

PCalc: Click this tab for a handy "pocket" calculator you can use when you need to calculate an entry needed for the calculator.

Data: Click this tab to save a set of entries or a note in between visits. Entries and notes will be stored to your web browser's local storage (if supported by your browser of choice), meaning they can only be recalled with the same device and web browser you were using when you saved them. If you'd like to save entries and notes between devices you can do so by subscribing to the Ad-Free Member Version.

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Move the slider to left and right to adjust the calculator width. Note that the Help and Tools panel will be hidden when the calculator is too wide to fit both on the screen. Moving the slider to the left will bring the instructions and tools panel back into view.

Also note that some calculators will reformat to accommodate the screen size as you make the calculator wider or narrower. If the calculator is narrow, columns of entry rows will be converted to a vertical entry form, whereas a wider calculator will display columns of entry rows, and the entry fields will be smaller in size ... since they will not need to be "thumb friendly".