Exams
Subjects
Classes
Home
Exams
Design Thinking and Innovation
Design Thinking
secondary research enable...
Question:
medium
Secondary research enables understanding of :
Show Hint
Always do your homework first! Spending a few hours on secondary research (reading market reports and papers) helps you ask much smarter questions when you sit down to interview actual users during primary research.
CBSE Class XII - 2026
CBSE Class XII
Updated On:
Jun 17, 2026
Only local habits
Universal design failures
Market trends and patterns
Peer opinions only
Show Solution
The Correct Option is
C
Solution and Explanation
Download Solution in PDF
Was this answer helpful?
0
Top Questions on Design Thinking
This stage of design is dedicated to understand user needs & objectives.
CBSE Class XII - 2025
Design
Design Thinking
View Solution
This phase of design thinking is all about experimentation and turning ideas into tangible products.
CBSE Class XII - 2025
Design
Design Thinking
View Solution
Which from the followings is \underline{not
a benefit of using design thinking at work?}
CBSE Class XII - 2025
Design
Design Thinking
View Solution
Experimenting at the limits of your knowledge and ability is crucial in being able to see things differently. This statement shows which principle of design thinking?
CBSE Class XII - 2025
Design
Design Thinking
View Solution
Want to practice more? Try solving extra ecology questions today
View All Questions
Questions Asked in CBSE Class XII exam
The role of a catalyst is to change _____________ .
CBSE Class XII - 2025
Surface Chemistry
View Solution
Which of the following statements is true for the function
\[ f(x) = \begin{cases} x^2 + 3, & x \neq 0, \\ 1, & x = 0? \end{cases} \]
CBSE Class XII - 2024
Functions
View Solution
\( \int_a^b f(x) \, dx \) is equal to:
CBSE Class XII - 2024
Functions
View Solution
Let \( \theta \) be the angle between two unit vectors \( \mathbf{\hat{a}} \) and \( \mathbf{\hat{b}} \) such that \( \sin \theta = \frac{3}{5} \). Then, \( \mathbf{\hat{a}} \cdot \mathbf{\hat{b}} \) is equal to:
CBSE Class XII - 2024
Vector Algebra
View Solution
If the direction cosines of a line are \( \sqrt{3}k, \sqrt{3}k, \sqrt{3}k \), then the value of \( k \) is:
CBSE Class XII - 2024
Trigonometry
View Solution