461520
Maths - Formulae and Equations
- Using Formula
- A taxi firm charges
£0.50 per miles plus
a fixed rate of £2.00
- It costs £2 + £0.50 to travel 1 mile, It
costs £2 + 2 x £0.50 to travel 2 miles
...
- So travelling 'n'
miles will cost £2 +
n x £0.50
- The formula is
COST = £2 + (n
x £0.50)
- Substitution
- What is the cost
of hiring the taxi
for 16 miles?
- C = £2 + (16 x £0.50)
- C = £2 + £8
- C = £10
- C = £10
- C = £2 + £8
- C = £2 + (16 x £0.50)
- What is the cost
of hiring the taxi
for 16 miles?
- Substitution
- The formula is
COST = £2 + (n
x £0.50)
- So travelling 'n'
miles will cost £2 +
n x £0.50
- It costs £2 + £0.50 to travel 1 mile, It
costs £2 + 2 x £0.50 to travel 2 miles
...
- A rectangle has a
width of x and a
length of 2x
- Perimeter = x + x + 2x + 2x
- P = 6x
- P = 6x
- Perimeter = x + x + 2x + 2x
- A taxi firm charges
£0.50 per miles plus
a fixed rate of £2.00
- Re-arranging Symbols
- Collecting like terms
- To simplify an
expression, we
collect like terms
- 4x + 5x - 2 - 2x + 7
- The x terms can be collected
together and the numbers can
be collected together
- So 4x + 5x - 2x = 7x and 7 - 2 = 5
- This simplifies to 7x + 5
- This simplifies to 7x + 5
- So 4x + 5x - 2x = 7x and 7 - 2 = 5
- The x terms can be collected
together and the numbers can
be collected together
- x + 5 + 3x - 7 + 9x + 3 - 4x
- So x + 3x + 9x
-4x = 9x and 5
+ 3 - 7 =1
- This simplifies to 9x + 1
- This simplifies to 9x + 1
- So x + 3x + 9x
-4x = 9x and 5
+ 3 - 7 =1
- 4x + 5x - 2 - 2x + 7
- To simplify an
expression, we
collect like terms
- Different Terms
- You may have to simplify an
equation with many different
terms and letters
- 5a + 3b - 3a - 5c + 4b
- Collect like terms
- 5a - 3a +3b +4b - 5c
- Simplify all terms
- 2a + 7b - 5c
- 2a + 7b - 5c
- Simplify all terms
- 5a - 3a +3b +4b - 5c
- Collect like terms
- 5a + 3b - 3a - 5c + 4b
- You may have to simplify an
equation with many different
terms and letters
- Multiplying out brackets
- 3(4x - 7)
- First Multiply: 3 x 4x = 12x
- Then multiply: 3 x -7 = -21
- Therefore: 3(4x - 7) = 12x - 21
- Therefore: 3(4x - 7) = 12x - 21
- Then multiply: 3 x -7 = -21
- First Multiply: 3 x 4x = 12x
- Remember whether the
numbers are negative or positive
- Multiplying out two brackets
- (x+4)(x+3)
- FOIL
- x2 + 7x + 12
- x2 + 7x + 12
- FOIL
- Brackets and Powers
- (a-5) squared
- (a-5)(a-5)
- a2 - 10a + 25
- a2 - 10a + 25
- (a-5)(a-5)
- (a-5) squared
- (x+4)(x+3)
- 3(4x - 7)
- Collecting like terms
- Changing the
subject of a formula
- Arrange the
formula C=2pi r to
make r the subject
- Divide both sides by 2pi
- r = C/ 2pi
- r = C/ 2pi
- Divide both sides by 2pi
- Rearrange the
formula V = 4/3 pi r
(3)
- Multiply by 3
- 3V = 4pi r (3)
- Divide by 4 pi
- 3V/ 4 pi = r(3)
- Take the cube root of both sides
- r = cube root of 3V / 4pi
- r = cube root of 3V / 4pi
- Take the cube root of both sides
- 3V/ 4 pi = r(3)
- Divide by 4 pi
- 3V = 4pi r (3)
- Multiply by 3
- Arrange the
formula C=2pi r to
make r the subject
- Simultaneous Equations
- 2x + y = 7
- 3x - y = 8
- Add the equations
- 5x = 15 so...
- x = 3
- Substitute in...
- (2 x 3) + y = 7
- y = 7-6
- x = 3, y = 1
- x = 3, y = 1
- y = 7-6
- (2 x 3) + y = 7
- Substitute in...
- x = 3
- 5x = 15 so...
- Add the equations
- 3x - y = 8
- If the item you want to remove is two
positives or two negatives you
subtract, if they are one positive and
one negative you add
- 2x + y = 7
- Equations with Fractions
- x/2 - 4 = 3
- +4 so x/2 = 7
- x2 so x = 14
- x2 so x = 14
- +4 so x/2 = 7
- x/2 - 4 = 3
- Trial and Improvement
- Always see to how
many d.p the answer
needs to be
- Remember to get
as close to the
final answer
- Remember to get
as close to the
final answer
- Always see to how
many d.p the answer
needs to be
- Index Notation
- Powers
- a squared = a x a
- b cubed = b x b x b
- 4d squared = 4 x d x d
- 4d squared = 4 x d x d
- b cubed = b x b x b
- a squared = a x a
- Index Laws
- When multiplying you add
the indices, when
subtracting you divide the
indices
- p3 x p7 = p10
- 4s3 x 3s2 = 12s5
- 4s3 x 3s2 = 12s5
- p3 x p7 = p10
- When multiplying you add
the indices, when
subtracting you divide the
indices
- Powers
- Solving Equations
- Using inverses
- x - 6 = 9
- x = 9+6
- x = 15
- x = 15
- x = 9+6
- x - 6 = 9
- Unknowns on
both side
- 3b + 4 = b + 12
- -b so 2b + 4 = 12
- -4 so 2b = 8
- /2 so b = 4
- /2 so b = 4
- -4 so 2b = 8
- -b so 2b + 4 = 12
- 3b + 4 = b + 12
- Equations with brackets
- 3(b+2) = 15
- 3 x b + 3 x 2 = 15
- 3b +6 = 15
- 3b = 9
- b = 3
- b = 3
- 3b = 9
- 3b +6 = 15
- 3 x b + 3 x 2 = 15
- 3(b+2) = 15
- Using inverses
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