Download presentation
Presentation is loading. Please wait.
1
Interpreting Terms And Evaluating Function
2
A formula is an equation that states a rule for a relationship among quantities.
In the formula d = rt, d is isolated. You can "rearrange" a formula to isolate any variable by using inverse operations. This is called solving for a variable.
3
Solving for a Variable Step 1 Locate the variable you are asked to solve for in the equation. Step 2 Identify the operations on this variable and the order in which they are applied. Step 3 Use inverse operations to undo operations and isolate the variable.
4
Additional Example 1: Application
The formula C = d gives the circumference of a circle C in terms of diameter d. The circumference of a bowl is 18 inches. What is the bowl's diameter? Leave the symbol in your answer. The question asks for diameter, so first solve the formula C = d for d. Locate d in the equation. Since d is multiplied by , divide both sides by to undo the multiplication.
5
Additional Example 1 Continued
The formula C = d gives the circumference of a circle C in terms of diameter d. The circumference of a bowl is 18 inches. What is the bowl's diameter? Leave the symbol in your answer. Now use this formula and the information given in the problem. The bowl's diameter is inches.
6
A nonzero number divided by itself equals 1. For t ≠ 0,
Helpful Hint
7
Check It Out! Example 1 Solve the formula d = rt for t. Find the time in hours that it would take Van Dyk to travel 26.2 miles if his average speed was 18 miles per hour. Round to the nearest hundredth. d = rt Locate t in the equation. Since t is multiplied by r, divide both sides by r to undo the multiplication. Now use this formula and the information given in the problem.
8
Check It Out! Example 1 Continued
Solve the formula d = rt for t. Find the time in hours that it would take Van Dyk to travel 26.2 miles if his average speed was 18 miles per hour. Van Dyk’s time was about 1.46 hours.
9
Additional Example 2A: Solving Formulas for a Variable
The formula for the area of a triangle is A = bh, where b is the length of the base, and h is the height. Solve for h. Locate h in the equation. Since bh is multiplied by , divide both sides by (multiply by , to undo the multiplication. 2A = bh Simplify.
10
Additional Example 2A Continued
The formula for the area of a triangle is A = bh, where b is the length of the base, and is the height. Solve for h. 2A = bh Since h is multiplied by b, divide both sides by b to undo the multiplication.
11
Dividing by a fraction is the same as multiplying by the reciprocal.
Remember!
12
Additional Example 2B: Solving Formulas for a Variable
Solve the formula for a person’s typing speed for e. Locate e in the equation. Since w–10e is divided by m, multiply both sides by m to undo the division. ms = w – 10e Since w is added to –10e, subtract w from both sides to undo the addition. –w –w ms – w = –10e
13
Additional Example 2B Continued
Solve the formula for a person’s typing speed for e. ms – w = –10e Since e is multiplied by –10, divide both sides by –10 to undo the multiplication.
14
Check It Out! Example 2 The formula for an object’s final velocity is f = i – gt, where i is the object’s initial velocity, g is acceleration due to gravity, and t is time. Solve for i. f = i – gt Locate i in the equation. f = i – gt + gt gt Since gt is subtracted from i, add gt to both sides to undo the subtraction. f + gt = i
15
A formula is a type of literal equation
A formula is a type of literal equation. A literal equation is an equation with two or more variables. To solve for one of the variables, use inverse operations.
16
Additional Example 3: Solving Literal Equations
A. Solve x + y = 15 for x. x + y = 15 Locate x in the equation. –y –y x = 15 – y Since y is added to x, subtract y from both sides to undo the addition. B. Solve pq = x for q. pq = x Locate q in the equation. Since q is multiplied by p, divide both sides by p to undo the multiplication.
17
Check It Out! Example 3a Solve 5 – b = 2t for t. 5 – b = 2t Locate t in the equation. Since t is multiplied by 2, divide both sides by 2 to undo the multiplication.
18
Check It Out! Example 3b Solve for V Locate V in the equation. Since m is divided by V, multiply both sides by V to undo the division. VD = m Since V is multiplied by D, divide both sides by D to undo the multiplication.
19
Lesson Quiz: Part I Solve for the indicated variable. 1. 2. 3. 2x + 7y = 14 for y 4. for h P = R – C for C C = R – P for m m = x(k – 6) 5. for C C = Rt + S
20
Lesson Quiz: Part II Euler’s formula, V – E + F = 2, relates the number of vertices V, the number of edges E, and the number of faces F of a polyhedron. 6. Solve Euler’s formula for F. F = 2 – V + E 7. How many faces does a polyhedron with 8 vertices and 12 edges have? 6
Similar presentations
© 2024 SlidePlayer.com. Inc.
All rights reserved.