Photo AI

2 (a) Rearrange this formula to make u the subject - OCR - GCSE Maths - Question 2 - 2023 - Paper 6

Question icon

Question 2

2---(a)-Rearrange-this-formula-to-make-u-the-subject-OCR-GCSE Maths-Question 2-2023-Paper 6.png

2 (a) Rearrange this formula to make u the subject. $$v^2 = u^2 + 2as$$ (b) A rocket accelerates at 90 m/s² and travels 270 km. The rocket's final velocity is... show full transcript

Worked Solution & Example Answer:2 (a) Rearrange this formula to make u the subject - OCR - GCSE Maths - Question 2 - 2023 - Paper 6

Step 1

Rearrange this formula to make u the subject

96%

114 rated

Answer

To rearrange the formula for uu, we start with the equation:
v2=u2+2asv^2 = u^2 + 2as.

  1. Subtract 2as2as from both sides:
    v22as=u2v^2 - 2as = u^2.
  2. Take the square root of both sides to isolate uu:
    u=ext±v22asu = ext{±} \sqrt{v^2 - 2as}.
    This gives us the rearranged formula for uu.

Step 2

Using part (a), or otherwise, calculate the rocket's initial velocity in m/s

99%

104 rated

Answer

Given the information:

  • Final velocity v=8000extm/sv = 8000 \, ext{m/s}
  • Acceleration a=90extm/s2a = 90 \, ext{m/s}^2
  • Distance s=270extkm=270000extms = 270 \, ext{km} = 270000 \, ext{m}

Using the rearranged formula from part (a):
u=v22asu = \sqrt{v^2 - 2as}
Substituting the known values:
u=80002290270000u = \sqrt{8000^2 - 2 \cdot 90 \cdot 270000}
Calculating 800028000^2:
=64000000= 64000000
Calculating 2902700002 \cdot 90 \cdot 270000:
=48600000= 48600000
Therefore:
u=6400000048600000=15400000u = \sqrt{64000000 - 48600000} = \sqrt{15400000}
Finally:
u3924.3extm/su \approx 3924.3 \, ext{m/s}.

Join the GCSE students using SimpleStudy...

97% of Students

Report Improved Results

98% of Students

Recommend to friends

100,000+

Students Supported

1 Million+

Questions answered

Other GCSE Maths topics to explore

Number Toolkit

Maths - Edexcel

Prime Factors, HCF & LCM

Maths - Edexcel

Powers, Roots & Standard Form

Maths - Edexcel

Simple & Compound Interest, Growth & Decay

Maths - Edexcel

Fractions, Decimals & Percentages

Maths - Edexcel

Rounding, Estimation & Bounds

Maths - Edexcel

Surds

Maths - Edexcel

Algebraic Roots & Indices

Maths - Edexcel

Expanding Brackets

Maths - Edexcel

Factorising

Maths - Edexcel

Completing the Square

Maths - Edexcel

Algebraic Fractions

Maths - Edexcel

Rearranging Formulae

Maths - Edexcel

Algebraic Proof

Maths - Edexcel

Linear Equations

Maths - Edexcel

Solving Quadratic Equations

Maths - Edexcel

Simultaneous Equations

Maths - Edexcel

Iteration

Maths - Edexcel

Forming & Solving Equations

Maths - Edexcel

Functions

Maths - Edexcel

Coordinate Geometry

Maths - Edexcel

Estimating Gradients & Areas under Graphs

Maths - Edexcel

Real-Life Graphs

Maths - Edexcel

Transformations of Graphs

Maths - Edexcel

Sequences

Maths - Edexcel

Direct & Inverse Proportion

Maths - Edexcel

Standard & Compound Units

Maths - Edexcel

Exchange Rates & Best Buys

Maths - Edexcel

Geometry Toolkit

Maths - Edexcel

Angles in Polygons & Parallel Lines

Maths - Edexcel

Bearings, Scale Drawing, Constructions & Loci

Maths - Edexcel

Area & Perimeter

Maths - Edexcel

Right-Angled Triangles - Pythagoras & Trigonometry

Maths - Edexcel

Sine, Cosine Rule & Area of Triangles

Maths - Edexcel

Vectors

Maths - Edexcel

Transformations

Maths - Edexcel

Scatter Graphs & Correlation

Maths - Edexcel

Statistics

Maths - Edexcel

Ratio Analysis and Problem Solving

Maths - Edexcel

Inequalities

Maths - Edexcel

Volume, Area & Surface Area

Maths - Edexcel

The Circle

Maths - Edexcel

Probability

Maths - Edexcel

Trigonometry

Maths - Edexcel

Growth & Decay

Maths - Edexcel

Outliers

Maths - Edexcel

;